Word Problem

Problem 6201

For each of the following, write a formula for the function, gg, obtained when the graph of ff is transformed as described. a. The graph of f(x)=x3f(x)=\sqrt[3]{x} is vertically stretched by a factor of 3 , then shifted to the right 4 units and down 6 units. g(x)=g(x)= \square b. The graph of f(x)=xf(x)=\sqrt{x} is horizontally compressed by a factor of 14\frac{1}{4}, then shifted to the left 7 units and down 3 units. g(x)=g(x)= \square
For additional help with this problem type, access the following resources: - TEXT Read College Algebra with Corequisite Support 2e 3.5 Transformation of Functions of the text.

See Solution

Problem 6202

ww-awu-aleks.com its Bexting and Onlin. Sports Betting Secrot -... 11/22/24 ATL C CHI /// St. Homo - Northern Essex. Content A ALEKs - Jonathen Vcga. ChatGPT (5) XaiCenat - Twitch Homework &4:7(1,2,3,4)8(2,3,4)\& 4: 7(1,2,3,4) 8(2,3,4) Question 34 of 40 (1 point) 1 Question Attempt: 1 of 3 Jonathan
Volunteering: The General Social Survey asked 1305 people whether they performed any volunteer work during the past year. A total of 522 people said they Español did.
Part 1 of 3 (a) Find a point estimate for the proportion of people who performed volunteer work during the past year. Round the answer to at least three decimal places.
The point estimate for the proportion of people who performed volunteer work during the past year is 0.4000 .
Alternate Answer: 0.4
Part 2 of 3 (b) Construct a 95%95 \% confidence interval for the proportion of people who performed volunteer work during the past year. Round the answer to at least three decimal places.
A 95%95 \% confidence interval for the proportion of people who performed volunteer work during the past year is 0.3737<p<0.42630.3737<p<0.4263.
Part: 2/32 / 3
Part 3 of 3 (c) A sociologist states that 46%46 \% of Americans perform volunteer work in a given year. Does the confidence interval contradict this statement? Explain.
The confidence interval (Choose one) \square contradict the claim, because 0.46 (Choose one) \square contained in the confidence interval. Skip Part Check Save For Later Submit Assignment - 2024 McGraw Hill LLC. All Rights Reserved. Terms of Use I Privacy Center I Accessibitity

See Solution

Problem 6203

Describe the translation of the graph of the inverse variation. y=5x+26y=\frac{5}{x+2}-6
Horizontal shift \square units \square left or right
Vertical shift: \square units \square up or down
If no shift type 0 for the number of units and none for up/down or left/right.

See Solution

Problem 6204

www-awu.aleks.com and Onlin. Sports Betting Secret - 11/22/24 ATL @ CHI III St... Home - Northern Essex... Content A Aleks - Jonathan Voga... ChatGPT (5) KaiCenat - Twitch Homework * 4: 7(1,2,3,4)8(2,3,4)7(1,2,3,4) 8(2,3,4) Question 35 of 40 (1 point) 1 Question Attempt: 1 of 3 Jonathan 2 23 24 25 26 27 28 29 30 31 32 Español 33
Contaminated water: In a sample of 44 water specimens taken from a construction site, 27 contained detectable levels of lead.
Part 1 of 3 (a) Construct a 95%95 \% confidence interval for the proportion of water specimens that contain detectable levels of lead. Round the answer to at least three decimal places.
A 95%95 \% confidence interval for the proportion of water specimens that contain detectable levels of lead is 0.471<p<0.7570.471<p<0.757.
Part: 1/31 / 3
Part 2 of 3 (b) Construct an 80%80 \% confidence interval for the proportion of water specimens that contain detectable levels of lead. Round the answer to at least three decimal places.
An 80%80 \% confidence interval for the proportion of water specimens that contain detectable levels of lead is \square <p<<p< \square . Skip Part Check Save For Later Submit Assignment - 2024 McGraw Hill LLC. All Rights Reserved. Terms of Use T Privacy Center I Accessibility

See Solution

Problem 6205

A rectangular garden bed measures 16 feet by 12 feet. A water faucet is located at one corner of the garden bed. A hose will be connected to the water faucet. The hose must be long enough to reach the opposite comer of the garden bed when stretched straight. Find the required length of hose.
The required length of the hose is \square \square (Type an exact answer using radicals as needed.)

See Solution

Problem 6206

ww-awu-aleks.com letting and Onlin Sports Betting Secret -m. 1122/24 ATL @CHI III St... Home - Northern Essex... Contont A) ALeks - Jonathan Voga.. ChatGPT (5) KaiConat - Twitch Homework * 4: 7(1,2,3,4)8(2,3,4)7(1,2,3,4) 8(2,3,4) Question 36 of 40 (1 point) I Question Attempt: 1 of 3 Jonathan 2 23 24 25 26 27 28 29 30 31 2\checkmark 2 Español 133
Changing jobs: A sociologist sampled 214 people who work in computer-related jobs, and found that 44 of them have changed jobs in the past 6 months. Part: 0/20 / 2 \square
Part 1 of 2 (a) Construct a 99.8%99.8 \% confidence interval for those who work in computer-related jobs who have changed jobs in the past 6 months. Round the answer to at least three decimal places.
A 99.8%99.8 \% confidence interval for the proportion of those who work in computer-related jobs who have chaneed jobs in the past 6 months is 0.2056α<p<0.08430.2056^{\boldsymbol{\alpha}}<p<0.0843.

See Solution

Problem 6207

www-awu.aleks.com Sports Betting Secret -... 11/22/24 ATL @ CHI /// St... Home - Northern Essex... Content ChatGPT (5) KaiCenat - Twitch Homework \# 4: 7(1,2,3,4) 8(2,3,4) Question 36 of 40 (1 point) I Question Attempt: 1 of 3 2 23 24 25 26 27 28 29 30 Español Jonathan
Changing jobs: A sociologist sampled 214 people who work in computer-related jobs, and found that 44 of them have changed jobs in the past 6 months. Part 1 of 2 (a) Construct a 99.8%99.8 \% confidence interval for those who work in computer-related jobs who have changed jobs in the past 6 months. Round the answer to at least three decimal places.
A 99.8%99.8 \% confidence interval for the proportion of those who work in computer-related jobs who have changed jobs in the past 6 months is 0.1203 \square
Part: 1/21 / 2
Part 2 of 2 (b) Among the 214 people, 128 of them are under the age of 35 . These constitute a simple random sample of workers under the age of 35. If this sample were used to construct a 99.8%99.8 \% confidence interval for the proportion of workers under the age of 35 who have changed jobs in the past 6 months, is it likely that the margin of error would be larger, smaller, or about the same as the one in Part (a)?
The margin of error would be (Choose one) \square , because the size of the sample is \square (Choose one) . Skip Part Check Save For Later Submit Assignment

See Solution

Problem 6208

www-awu.aleks.com Ig and Onlin... Sports Betting Secret -... 11/22/24 ATL @ CHI /// St... Home - Northern Essex... Content ALEKS - Jonathan Vega... ChatGPT
Homework \# 4: 7(1,2,3,4)8(2,3,4)7(1,2,3,4) 8(2,3,4) Question 39 of 40 (1 point) | Question Attempt: 1 of 3 29 30 31\checkmark 31 33 34 35 36 37 38
IQ scores: Scores on an IQ test are normally distributed. A sample of 8 IQ scores had standard deviation s=6s=6. (a) Construct a 95%95 \% confidence interval for the population standard deviation σ\sigma. Round the answers to at least two decimal places. (b) The developer of the test claims that the population standard deviation is σ=7\sigma=7. Does this confidence interval contradict this claim? Explain.
Part: 0/20 / 2
Part 1 of 2
A 95%95 \% confidence interval for the population standard deviation is 3.97<σ<10.793.97<\sigma<10.79.

See Solution

Problem 6209

Find the values of xx and yy that satisfy the given equation. 4x2yj=24+16j4 x-2 y j=24+16 j x=\mathrm{x}= \square (Type an exact answer, using radicals and jj as needed.)

See Solution

Problem 6210

What is the horizontal asymptote of the following function? * y=2(x1)+2y=-2^{(x-1)}+2 y=2y=-2 y=1y=-1 y=0y=0 y=1y=1 y=2y=2

See Solution

Problem 6211

Onlin. Sports Betting Secret - 11/22/24 ATL @ CHI I// St... Home - Northern Essex... Content ChatGPT (5) KaiCenat - Twitch Homework : 4:7(1,2,3,4)8(2,3,4)4: 7(1,2,3,4) 8(2,3,4) Question 16 of 40 (1 point) I Question Attempt: 1 of 3 Jonathan 14\checkmark 14 15 =16=16 =18=18 19 20 22 23 24 Español 25>
SAT scores: Assume that in a given year the mean mathematics SAT score was 522, and the standard deviation was 116 . A sample of 66 scores is chosen. Use the TI-84 Plus calculator.
Part 1 of 5 (a) What is the probability that the sample mean score is less than 509? Round the answer to at least four decimal places.
The probability that the sample mean score is less than 509 is 0.1841® 0.1841{ }^{\text {® }}.
Correct Answer:
The probability that the sample mean score is less than 509 is 0.1813 .
Part: 1/51 / 5
Part 2 of 5 (b) What is the probability that the sample mean score is between 486 and 525? Round the answer to at least four decimal places.
The probability that the sample mean score is between 486 and 525 is \square Skip Part Check Save For Later Submit Assignment (c) 2024 McGraw Hill LLC. All Rights Reserved.Terms of Use I Privacy Center I Accessibility

See Solution

Problem 6212

Determine la siguiente sumatoria. Escriba el resultado redondeado al entero más cercano. Sólo escriba dígitos en la contestación. No escriba comas ni puntos. i=1100(i332i2)\sum_{i=1}^{100}\left(\frac{i^{3}}{3}-2 i^{2}\right)
Add your answer Integer, decimar, or Enotation allowed

See Solution

Problem 6213

www-awu-aleks.com Sports Beting Secret -... 11/22/24 ATL @ CHI /// St... Homo - Northern Essex... Content A Aleks - Jonathan Vcga... ChatGPT (5) Kalcenat - Twitch Homework \# 4: 7(1,2,3,4)8(2,3,4)7(1,2,3,4) 8(2,3,4) Question 16 of 40 (1 point) I Question Attempt: 1 of 3 Jonathan
SAT scores: Assume that in a given year the mean mathematics SAT score was 522, and the standard deviation was 116. A sample of 66 scores is chosen. Use the TI-84 Plus calculator. Español
Part 1 of 5 (a) What is the probability that the sample mean score is less than 509? Round the answer to at least four decimal places.
The probability that the sample mean score is less than 509 is 0.184180.1841^{8}.
Correct Answer:
The probability that the sample mean score is less than 509 is 0.1813 .
Part 2 of 5 (b) What is the probability that the sample mean score is between 486 and 525? Round the answer to at least four decimal places.
The probability that the sample mean score is between 486 and 525 is 0.5773
Part: 2/52 / 5
Part 3 of 5 (c) Find the 90th 90^{\text {th }} percentile of the sample mean. Round the answer to at least two decimal places.
The 90th 90^{\text {th }} percentile of the samplemean is \square . part Check Save For Later Submit Assignment @ 2024 MeGraw Hill LLC. All Rights Reserved. Terms of Use I Privacy Center I Accessibility

See Solution

Problem 6214

For the following situation, find the average monthly expense that you would use in budgeting for the given expense. Note: Annual means once a year, and semiannual means twice a year. Lan pays a semiannual premium of $750\$ 750 for automobile insurance, a monthly premium of $140\$ 140 for health insurance, and an annual premium of $450\$ 450 for life insurance.
The average monthly expense is $\$ \square (Round to the nearest cent as needed.)

See Solution

Problem 6215

The electric cooperative needs to know the mean household usage of electricity by its non-commercial customers in kWh per day. Assume that the population standard deviation is 2.5 kWh . The mean electricity usage per family was found to be 17.7 kWh per day for a sample of 443 families. Construct the 80%80 \% confidence interval for the mean usage of electricity. Round your answers to one decimal place.

See Solution

Problem 6216

Eric and Linda are paid $41.25\$ 41.25 for their work. Eric worked 2.5 hours, and Linda worked 3 hours. They split the money according to the amount of time each of them worked. How much is Eric's share of the money? Explain.
Eric and Linda are paid \ \square(Typeintegersordecimals.)foreachhourworked.Ericsshareofthemoneyis (Type integers or decimals.) for each hour worked. Eric's share of the money is \$$ $\square$.

See Solution

Problem 6217

www-awu.aleks.com ig and Onlin. Sports Betting Secret -- 11/22/24 ATL @ CHI I// St... Home - Northern Essex... Content ChatGPT (5) KaiCenat - Twitc Homework 4 4:7(1,2,3,4) 8(2,3,4) Question 17 of 40 (1 point) I Question Attempt: 1 of 3 Jonathan 14\checkmark 14 15 16 - 1. =18=18 19 20 21\checkmark 21 22 23\checkmark 23 Espariol 25
Taxes: The Internal Revenue Service reports that the mean federal income tax paid in the year 2010 was $8040\$ 8040. Assume that-the standard deviation is $4500\$ 4500. The IRS plans to draw a sample of 1000 tax returns to study the effect of a new tax law.
Part 1 of 5 (a) What is the probability that the sample mean tax is less than $7900\$ 7900 ? Round the answer to at least four decimal places.
The probability that the sample mean tax is less than $7900\$ 7900 is 0.1628
Part: 1/51 / 5
Part 2 of 5 (b) What is the probability that the sample mean tax is between $7400\$ 7400 and $8100\$ 8100 ? Round the answer to at least four decimal places.
The probability that the sample mean tax is between $7400\$ 7400 and $8100\$ 8100 is 0.9986$0.9986^{\$}. Skip Part Check Save For Later Submit Assignment 2024 McGraw Hill LLC. All Rights Reserved. Terms of Use I Privacy Center 1 Accessibity

See Solution

Problem 6218

(4) 112101 \frac{12}{10}
Name: \qquad Trade: \qquad

See Solution

Problem 6219

ww-awu-alcks.com Sports Betting and Onlin. Sports Boting Secret - 11122/2411122 / 24 ATL @ CHI/// St... Home - Northern Essex wt{ }_{w t} Content A aleks - Jonathan Vogam. ChatGPT (5) Kaic Homework 4 4: 7(1,2,3,4)8(2,3,4)7(1,2,3,4) 8(2,3,4) Question 17 of 40 (1 point) I Question Attempt 1 of 3 Jonatha
Taxes: The Internal Revenue Service reports that the mean federal income tax paid in the year 2010 was $8040\$ 8040. Assume that the standard deviation is $4500\$ 4500. The IRS plans to draw a sample of 1000 tax returns to study the effect of a new tax law.
Part 1 of 5 (a) What is the probability that the sample mean tax is less than $7900\$ 7900 ? Round the answer to at least four decimal places.
The probability that the sample mean tax is less than $7900\$ 7900 is 0.1628 .
Part 2 of 5 (b) What is the probability that the sample mean tax is between $7400\$ 7400 and $8100\$ 8100 ? Round the answer to at least four decimal places.
The probability that the sample mean tax is between $7400\$ 7400 and $8100\$ 8100 is 0.6628 . Correct Answer:
The probability that the sample mean tax is between $7400\$ 7400 and $8100\$ 8100 is 0.6634 .
Part: 2/52 / 5
Part 3 of 5 (c) Find the 80th 80^{\text {th }} percentile of the sample mean. Round the answer to at least two decimal places.
The 80th 80^{\text {th }} percentile of the sample mean is $\$ \square Skip Part Check Save For Later Submit Assignment - 2024 MeGraw Hill LLC. All Rights Reserved. Terms of Use 1 Privagy Center I Accessibility

See Solution

Problem 6220

The following formulas give animal populations as functions of time, tt, in years. Describe the growth of each population in words. (a) P=1200+300tP=1200+300 t
The population is \square .
Its initial value is ii
The change is happening at \square (b) P=270080tP=2700-80 t
The population is \square .
Its initial value is \square \square .
The change is happening at \square (c) P=1700(1.03)tP=1700(1.03)^{t}
The population is \square .
Its initial value is \square .
The change is happening at \square of \square

See Solution

Problem 6221

The pp-value for a hypothesis test turns out to be 0.051785. At a 7\% level of significance, what is the proper decision? Fail to reject H0H_{0} Reject H0H_{0}

See Solution

Problem 6222

The American Heart Association is about to conduct an anti-smoking campaign and wants to know the fraction of Americans over 40 who smoke. Step 2 of 2: Suppose a sample of 1548 Americans over 40 is drawn. Of these people, 1100 don't smoke. Using the data, construct the 99%99 \% confidence interval for the population proportion of Americans over 40 who smoke. Round your answers to three decimal places.

See Solution

Problem 6223

Question Watch Video Show Examples
In BCD\triangle B C D, the measure of D=90,CB=85,BD=36\angle D=90^{\circ}, C B=85, B D=36, and DC=77D C=77. What is the value of the cosine of B\angle \mathrm{B} to the nearest hundredth?
Answer Attempt 1 out of 2 Submit Answer Sign out Nov 22 7:48

See Solution

Problem 6224

If you paid $57\$ 57 to a loan company for the use of $1,513\$ 1,513 for 108 days, what annual rate of interest did they charge? (Assume a 360-day year.)
The annual rate of interest is \square \%. (Round to three decimal places.)

See Solution

Problem 6225

10:4/PM Fri Nov 22
You wish to test the following claim ( HaH_{a} ) at a significance level of α=0.01\alpha=0.01. Ho:μ=83.5Ha:μ83.5\begin{array}{l} H_{o}: \mu=83.5 \\ H_{a}: \mu \neq 83.5 \end{array}
You believe the population is normally distributed, but you do not know the standard deviation. You obtain a sample of size n=556n=556 with mean xˉ=85.4\bar{x}=85.4 and a standard deviation of s=16.7s=16.7.
What is the test statistic for this sample? (Report answer accurate to three decimal places.) test statistic = \square
What is the pp-value for this sample? (Report answer accurate to four decimal places.) p -value = \square The pp-value is... less than (or equal to) α\alpha greater than α\alpha
This test statistic leads to a decision to... reject the null accept the null fail to reject the null
As such, the final conclusion is that... There is sufficient evidence to warrant rejection of the claim that the population mean is not equal to 83.5 . There is not sufficient evidence to warrant rejection of the claim that the population mean is not equal to 83.5 . The sample data support the claim that the population mean is not equal to 83.5. There is not sufficient sample evidence to support the claim that the population mean is not equal to 83.5 . Check Answer

See Solution

Problem 6226

Solve the polynomial inequality and graph the solution set on a real number line. Express the solution set in interval notation. (x3)(x+9)>0(x-3)(x+9)>0

See Solution

Problem 6227

A conical tank (vertex down) is 7 meters across the top and 9 meters deep. If the depth of the water (the height) is decreasing at 6.6 meters per minute, what is the change in the volume of the water in the tank when the height of the water in the tank is 4 meters?
Include units on your final answer, and your answer must be entered as number (not 5*7+3).

See Solution

Problem 6228

A conical tank (vertex down) is 7 meters across the top and 9 meters deep. If the depth of the water (the height) is decreasing at 6.6 meters per minute, what is the change in the volume of the water in the tank when the height of the water in the tank is 4 meters?
Include units on your final answer, and your answer must be entered as number (not 5*7+3).

See Solution

Problem 6229

Solve the polynomial inequality and graph the solution set on a real number line. Express the solution set in interval notation. x2+8x+15>0x^{2}+8 x+15>0

See Solution

Problem 6230

王某一屯田处, 士兵们正忙着劳作, 如果让勇武营独自耕作需5小时, 如果让斥候营独 \#作需10小时, 如果让铁骑营独自耕作需30小时。一开始, 三个营一起耕作, 中途勇因操练撤走了,最后一共用 6 小时完成耕作,勇武营实际耕作了 \qquad小时。

See Solution

Problem 6231

Select the correct answer.
The elimination method is ideal for solving this system of equations. By which number must you multiply the second equation to eliminate the yy-variable, and what is the solution for this system? x+3y=422xy=14\begin{array}{l} x+3 y=42 \\ 2 x-y=14 \end{array} A. Multiply the second equation by -3 . The solution is x=12,y=9x=12, y=9. B. Multiply the second equation by -2 . The solution is x=12,y=10x=12, y=10. C. Multiply the second equation by 2 . The solution is x=15,y=9x=15, y=9. D. Multiply the second equation by 3 . The solution is x=12,y=10x=12, y=10.

See Solution

Problem 6232

Find an angle ϕ\phi, with 0<ϕ<3600^{\circ}<\phi<360^{\circ} that has the same a) cosine as 5252^{\circ} i 308 degrees b) sine as 5252^{\circ} \square 128 degrees

See Solution

Problem 6233

11
Type the correct answer in each box.
John sells plain cakes for $8\$ 8 and decorated cakes for $12\$ 12. On a particular day, John started with a total of 100 cakes, and sold all but 4. His sales that day totaled $800\$ 800.
He sold \square plain cakes and \square decorated cakes that day.

See Solution

Problem 6234

Measurement Word problem involving a U.S. Customary length conversion
Joe drove a total distance of 72,230.472,230.4 yd on a race track. He drove 12 laps, where each lap was the same length. What was the length of each lap? Write your answer in miles.
Use the table of conversion facts as necessary, and do not round your answer. \square mi \begin{tabular}{|r|} \hline Conversion facts for length \\ \hline 12 inches (in)=1(\mathrm{in})=1 foot (ft)(\mathrm{ft}) \\ \hline 3 feet (ft)=1(\mathrm{ft})=1 yard (yd)(\mathrm{yd}) \\ \hline 36 inches (in)=1(\mathrm{in})=1 yard (yd)(\mathrm{yd}) \\ \hline 5280 feet (ft)=1(\mathrm{ft})=1 mile (mi)(\mathrm{mi}) \\ \hline 1760 yards (yd)=1(\mathrm{yd})=1 mile (mi)(\mathrm{mi}) \\ \hline \end{tabular}

See Solution

Problem 6235

Problem 5. (1 point)
Find the equation of the line tangent to the graph of y=2ln(x)y=2 \ln (x) at x=1x=1. Tangent Line: y=y= \square

See Solution

Problem 6236

45. 46 Хоорондоо 63 км зайтай хоёр суурингаас хоёр явган хүн зэрэг гарч 9 цагийн дараа уулзж Харав 1 на 1.5 дахин хурдан, 1 нь 2 дахин хурдан явбал тэд 5 цаг 15 минутын дараа уулзах байсан бол хүн бүрийн хурдыг ол Онгон сум 780 км/ц хурдтай нисэж яваад ниссэн зайнаасаа 680 км-ээр бага зай үлдэж үед 230 китай писав Онгоцны бүх замын туршид явсан дундаж хурд 800

See Solution

Problem 6237

Practico
Positive ovaluating, preact whether each product will be Then, or negativ, Dredict w to confirm che one. product a) (4)×(+5)=(20)(Communication)(-4) \times(+5)=(-20)(C o m m u n i c a t i o n) b) (5)×(3)=(+15)(-5) \times(-3)=(+15)
I Choose bl
2. List three pairs of numbers that have each product. (Knowledge and Understanding) (Communication) a) 24 b) -36

See Solution

Problem 6238

(1) Liz bought four 2-quart packages of strawberries. How many gallons of strawberries did she buy? \qquad (number model) Answer: \qquad gallons

See Solution

Problem 6239

What is the formula for iron(III) nitrate? \square
What is the formula for iron(II) fluoride? \square
What is the formula for cobalt(III) acetate? \square

See Solution

Problem 6240

Espaniol
A construction worker is building a wall. The wall is 20 yd long. He needs to place a stud every 16 in . The first stud has already been placed at one end of the wall. How many additional studs are needed, if the last stud will be placed at the other end of the wall?
First fill in the blanks on the left side of the equation using three of the ratios shown. Then write your answer on the right side of the equation.

See Solution

Problem 6241

17. If converses sinθ=0.14\sin \theta=0.14, find the value of θ\theta
A 10 B. 3737^{\circ}
C 4848^{\circ} D. 5959^{\circ}

See Solution

Problem 6242

甲、乙二人同时从两地出发, 相向而行。走完全程甲需60分钟, 乙需40分钟。出发后 5 分钟, 甲因忘带东西而返回出发点, 取东西又耽误了5分钟。甲再出发后 \square两人相遇。分钟

See Solution

Problem 6243

Probability WORKSHEET 7.3
5. In a class of 50 students, 18 take Chorus, 26 take Band, and 2 take both Chorus and Band. How many students in the class are not enrolled in either Chorus or Band?
6. In a school of 300\mathbf{3 0 0} students, 90 students are in the band, 185 students are on sports teams, and 60 students participate in both activities. How many students are involved in either band or sports?
7. A veterinarian surveys 26 of his patrons. He discovers that 14 have dogs, 10 have cats, and 5 have fish. Four have dogs and cats, 3 have dogs and fish, and one has a cat and fish. If no one has all three kinds of pets, how many patrons have none of these pets?
8. From a survey of 100 college students, a marketing research company found that 75 students owned stereos, 45 owned cars, and 35 owned cars and stereos. a) How many students owned either a car or a stereo? \qquad b) How many students did not own either a car or a stereo? \qquad

See Solution

Problem 6244

хоорондоо хэдэн км зайтай вэ?
49. Нисэх онгоцны буудал дээр 500 м урт урсдаг хэвтээ зам байжээ. Түүний хурд 4 км/ц бөгөөд Хүслэн, Нандиа хоёр энэ зам дээр хамт алхаж гарсан ба Хүслэн 6kм/ц6 \mathrm{kм} / ц хурдтай алхаж, Нандиа зугээр зогссон бол зам дуусахад Хүслэн, Нандиагаас хэр холдсон байх вэ? 274

See Solution

Problem 6245

Cash flows from (used for) operating activities-indirect method The net income reported on the income statement for the current year was $150,900\$ 150,900. Depreciation recorded on store equipment for the year amounted to $24,900\$ 24,900. Balances of the current asset and current liability accounts at the beginning and end of the year are as follows: \begin{tabular}{l|cc} & End of Year & Beginning of Year \\ \hline Cash & $57,490\$ 57,490 & $52,890\$ 52,890 \\ Accounts receivable (net) & 41,220 & 39,090 \\ Inventories & 56,280 & 59,500 \\ Prepaid expenses & 6,320 & 5,020 \\ Accounts payable (merchandise creditors) & 53,870 & 50,030 \\ Wages payable & 29,430 & 32,690 \end{tabular} a. Prepare the "Cash flows from (used for) operating activities" section of the statement of cash flows, using the indirect method. Use the minus sign to indicate cash outflows, cash payments, decreases in cash, or any negative adjustments.

See Solution

Problem 6246

What is the name of the compound with the formula Al(NO2)3\mathrm{Al}\left(\mathrm{NO}_{2}\right)_{3} ?
What is the name of the compound with the formula K2CrO4\mathrm{K}_{2} \mathrm{CrO}_{4} ? \square What is the name of the compound with the formula MgSO3\mathbf{M g S O}_{\mathbf{3}} ? \square

See Solution

Problem 6247

Solve the triangle, if possible. a=23.5 cm,b=11.77 cm,A=32.1a=23.5 \mathrm{~cm}, b=11.77 \mathrm{~cm}, A=32.1^{\circ}
Select the correct choice below and, if necessary, fill in the answer box to complete your choice. (Round degree measures to the nearest tenth as needed. Round side measures to the nearest hundredth as needed.) A. There are 2 possible solutions to the triangle. The measurements for the solution with the longer side cc are as follows. BB \approx \square CC \approx 0 cc \approx \square cm The measurements for the solution with the shorter side c are as follows. =\wedge= \square C\mathrm{C} \approx \square cc \approx \square cm B. There is 1 possible solution to the triangle. The measurements for the remaining angles BB and CC and side CC are as follows. BB \approx \square C\mathrm{C} \approx \square cc \approx \square cm C. There are no possible solutions for the triangle.

See Solution

Problem 6248

3. Samar is climbing a mountain in British Columbia. They know that as they climb higher, the temperature will or. For each 150 m Samar climbs up, the temperature will be 1C1^{\circ} \mathrm{C} cooler.
They are starting from a base camp at 1500 m where the temperature is 8C8^{\circ} \mathrm{C}. What will the temperature be at an altitude of 3000 m ? (Knowledge and Understanding) (Thinking) (Application)

See Solution

Problem 6249

Attempt 1: 10 attempts remaining.
Translate the statement of variation below into an equation using kk as the constant of variation. ss varies jointly as gg and the square of tt.

See Solution

Problem 6250

Español
As part of an annual fundraiser to help raise money for cancer research, Susan joined a walkathon. The track she walked on was 770 yd long. Susan walked 16 laps. Her sponsors agreed to donate an amount of money for each mile she walked. How many miles did she walk? First fill in the blanks on the left side of the equation using three of the ratios shown. Then write your answer on the right side of the equation. \begin{tabular}{|ccc} \hline ft & yd & mi \\ \frac{\square}{\square} & in & lap \\ \hline×\times & 5 \\ \hline \end{tabular}

See Solution

Problem 6251

An analysis of the general ledger accounts indicates that office equipment, which cost $280,000\$ 280,000 and on which accumulated depreciation totaled $153,900\$ 153,900 on the date of sale, was sold for $108,200\$ 108,200 during the year.
Using this information, indicate the items to be reported on the statement of cash flows.
Transactions $280,000\$ 280,000 cost of office equipment \153,900accumulateddepreciation153,900 accumulated depreciation \108,200 108,200 sales price $17,900\$ 17,900 loss on sale of equipment (assume the indirect method is used)
Section of Statement of Cash Flows \square \square \square \square
Added or Deducted \square \square \qquad \qquad

See Solution

Problem 6252

growth rate.
If P=30000P=30000 when t=3t=3 years and P=40000P=40000 when t=4t=4 years, what is the population when t=10t=10 years? Round your answer to the nearest integer.

See Solution

Problem 6253

Attempt 1: 10 attempts remaining.
The length mm, in inches, of a model train is directly proportional to the length rr, in inches, of the corresponding real train. (a) Write an equation that expresses mm as a function of rr, using kk for the constant of proportionality. \square help (equations) (b) An N\mathbf{N} scale model train is 1/1601 / 160 th the size of a real train. What is the constant of proportionality? \square help (numbers) What is the length, in feet, of a real locomotive if its N\mathbf{N} scale model is 11 inches long? \square feet. help (numbers) (c) An HO scale model train is 1/871 / 87 th the size of a real train. What is the constant of proportionality? \square help (numbers) What is the length, in inches, of an HO scale model if its real locomotive is is 75 feet long? \square inches. help (numbers)

See Solution

Problem 6254

Conceptual Question 13.9
The mass of Jupiter is 300 times the mass of the earth. Jupiter orbits the sun with TJupiter =11.9yrT_{\text {Jupiter }}=11.9 \mathrm{yr} in an orbit with rJupiter =5.2τearth r_{\text {Jupiter }}=5.2 \tau_{\text {earth }}. Suppose the earth could be moved to the distance of Jupiter and placed in a circular orbit around the sun.
The new period will be 1 yr . The new period will be between 1 yr and 11.9 yr .
The new period will be 11.9 yr . The new period will be more than 11.9 yr .
The new period of the earth would depend on its speed.
It's impossible br a planet of earth's mass to orbit at the distance of Jupiter. otherwise the earth and Jupiter would collide. according to the third law of Kepler the orbital period depends on the semimajor axis length but not on the mass of the planet. the mass of the earth is less than the mass of Jupiter.
This can be explained by the fact that \square \square

See Solution

Problem 6255

Use synthetic division to find the quotient and remainder when 2x4+9x3+x28x+72 x^{4}+9 x^{3}+x^{2}-8 x+7 is divided by x+4x+4 by completing the parts below. (a) Complete this synthetic division table. \begin{tabular}{llllll} \hline 4)) & 2 & 9 & 1 & -8 & 7 \end{tabular} \square \square \square \square \square \square \square \square \square (b) Write your answer in the following form: Quotient + Remainder x+4+\frac{\text { Remainder }}{x+4}. 2x4+9x3+x28x+7x+4=+x+4\frac{2 x^{4}+9 x^{3}+x^{2}-8 x+7}{x+4}=\square+\frac{\square}{x+4} Explimition Check © 2024 McGraw Hill LLC. All Rights Reserved. Terms of Use I Privacy Center I Accessibility

See Solution

Problem 6256

In parallelogram HIJKH I J K, the measure of angle HH is 4545^{\circ}. a. Find the measure of angle JJ.
Type the answer in the box below.
Angle JJ has a measure of \square !.
Explain how you know. Type your response in the space below.
B II U ■ 非 1=1= 2=2=
Type here

See Solution

Problem 6257

Question 4 (1 point) Place the number 4600880 into scientific notation. Use a.bc ×10d\times 10^{d} or d^{-d} format. (abcd or abc-d) in your answer

See Solution

Problem 6258

Use z=93+9iz=9 \sqrt{3}+9 i and w=3616iw=-\frac{\sqrt{3}}{6}-\frac{1}{6} i to compute the quantity. Express your answers in polar form rcis(θ)r \operatorname{cis}(\theta). The exercise should be worked out without the aid of a calculator. Give your answer in trigonometric form, with 0θ<2π0 \leq \theta<2 \pi : wz2=cis()\frac{w}{z^{2}}=\square \operatorname{cis}(\square) Submit Question

See Solution

Problem 6259

Question 10 (1 point) Convert 5.10 m to mm (do not use scientific notation) record the whole value. Just record the value and not the units.
Your Answer: \square Answer
Question 11 (1 point) Convert 3 hours to minutes (do not use scientific notation). Record the whole number values with no units.
Your Answer: \square Answer

See Solution

Problem 6260

Solving a word problem usting a quinalauct
A model rocket is launched with an initial upward velocity of 215ft/s215 \mathrm{ft} / \mathrm{s}. The rockets height hh (in feet) after tt seconds is given by the following. Espan h=215t16t2h=215 t-16 t^{2}
Find all values of tt for which the rocket's height is 97 feet. Round your answer(s) to the nearest hundredth. (if there is more than one answer, use the "or" button.) t= seconds t=\square \text { seconds } \square or \square

See Solution

Problem 6261

(k) Prove that bisectors of any two adjacent angles of a parallelogram are at right (ii) Prove that bisectors of any two opposite angles of a parallelogram are parallel. (iii) If the diagonals of a quadrilateral are equal and bisect each other at right angles, then prove that it is a square. (i) If ABCD is a rectangle in which the diagonal BD bisects B\angle \mathrm{B}, then show that ABCDA B C D is a square. (ii) Show that if the diagonals of a quadrilateral are equal and bisect each other a

See Solution

Problem 6262

a. A rectangular pen is built with one side against a barn. If 400 m of fencing are used for the other three sides of the pen, what dimensions maximize the area of the pen? b. A rancher plans to make four identical and adjacent rectangular pens against a barn, each with an area of 225 m2225 \mathrm{~m}^{2}. What are the dimensions of each pen that minimize the amount of fence that must be used? \begin{tabular}{|l|l|l|l|l|} \hline \multicolumn{4}{|c|}{ Bam } \\ \hline 225 & 225 & 225 & 225 \\ \hline \end{tabular} a. To maximize the area of the pen, the sides perpendicular to the barn should be 100 m long and the side parallel to the barn should be 200 m long. (Type exact answers, using radicals as needed.) b. To minimize the amount of fence that must be used, each of the sides perpendicular to the barn should be 33 m long and each of the sides parallel to the barn should be 35 m3 \sqrt{5} \mathrm{~m} long. (Type exact answers, using radicals as needed.)

See Solution

Problem 6263

Fiona bought some socks that cost $4.95\$ 4.95 for each pair and some belts that cost $6.55\$ 6.55 each. Fiona spent $27.95\$ 27.95 in all. Let aa represent the number of pairs of socks purchased and bb the number of belts purchased.
Which equation models the situation? a+b=11.50a+b=11.50 a+b=27.95a+b=27.95 4.95a+6.55b=27.954.95 a+6.55 b=27.95 6.55a+4.95b=27.956.55 a+4.95 b=27.95

See Solution

Problem 6264

a. A rectangular pen is built with one side against a barn. If 100 m of fencing are used for the other three sides of the pen, what dimensions maximize the area of the pen? b. A rancher plans to make four identical and adjacent rectangular pens against a barn, each with an area of 225 m2225 \mathrm{~m}^{2}. What are the dimensions of each pen that minimize the amount of fence that must be used? \begin{tabular}{|l|l|l|l|l|} \hline \multicolumn{4}{|c|}{ Barn } \\ \hline 225 & 225 & 225 & 225 \\ \hline \end{tabular} a. To maximize the area of the pen, the sides perpendicular to the barn should be \square m long and the side parallel to the barn should be \square m long. (Type exact answers, using radicals as needed.)

See Solution

Problem 6265

Wei has $150.00\$ 150.00 to make a garland using 60 -cent balloons. He wants to purchase 100 blue balloons and some number of white balloons. He learns that the white balloons are on sale for half price. He writes and solves an equation to find the number of white balloons he can purchase. Which models can be used to solve the problem? 100b+w=150;6,000+w=150100 b+w=150 ; 6,000+w=150 100b+w=150;100b+30=150100 b+w=150 ; 100 b+30=150 0.60b+0.30w=150;60+0.30w=1500.60 b+0.30 w=150 ; 60+0.30 w=150 0.60b+0.30w=150;100+0.30w=1500.60 b+0.30 w=150 ; 100+0.30 w=150

See Solution

Problem 6266

Let sinA=35\sin A=\frac{3}{5} with AA in QII and sinB=817\sin B=-\frac{8}{17} with BB in QIII. Find sin(A+B),cos(A+B)\sin (A+B), \cos (A+B), and tan(A+B)\tan (A+B). sin(A+B)=cos(A+B)=tan(A+B)=\begin{array}{l} \sin (A+B)=\square \\ \cos (A+B)=\square \\ \tan (A+B)=\square \end{array}
In what quadrant does A+BA+B terminate? quadrant I quadrant II quadrant III quadrant IV Submit Answer

See Solution

Problem 6267

Learn with an example
A 4-yard roll of white paper costs $1.36\$ 1.36. What is the unit price? \ \square$ per yard Submit

See Solution

Problem 6268

An 8-kilogram bag of onions costs $10.96\$ 10.96. What is the unit price? \ \square$ per kilogram Submit

See Solution

Problem 6269

A 3-pack of frozen burritos costs $3.87\$ 3.87. What is the unit price? \ \square$ per burrito Submit

See Solution

Problem 6270

A 5 -meter roll of fabric costs $11.80\$ 11.80. What is the unit price? \ \square$ per meter Submit

See Solution

Problem 6271

of 8 VVS: 30-2 A5 21/22 Sem
Each year, a baseball team sells boxes of chocolates as a fundraiser to lower the cost of team fees. The price of the chocolates and the number of boxes sold varies each year. The information from five years of sales is given in the table below. \begin{tabular}{|c|c|c|c|c|c|} \hline \begin{tabular}{c} Price per \\ box (\) \end{tabular} & 3.00 & 4.00 & 5.50 & 6.50 & 8.00 \\ \hline \begin{tabular}{c} Boxes \\ sold \end{tabular} & 5837 & 3571 & 1950 & 1409 & 1118 \\ \hline \end{tabular} a. Find the regression equation in the form y=a x^{3}+b x^{2}+c x+dthatbestapproximatesthedata.Expressthevaluesof that best approximates the data. Express the values of a, b, c,and, and dtothenearesthundredth.(1mark)b.Usetheequationtofindthenumberofboxes,tothenearestwholenumber,thattheteamwillselliftheycharge to the nearest hundredth. (1 mark) b. Use the equation to find the number of boxes, to the nearest whole number, that the team will sell if they charge \4.35 4.35 per box. ( 1 mark) c. One year, the team only sold 366 boxes of chocolates. What price did they charge for each box? (1 mark) d. If the team raises the price too high, they will not sell any boxes. Use your regression equation to predict the lowest price of a box that will result in zero boxes sold. (1 mark)

See Solution

Problem 6272

57 Replies, 57. Unread
Discussion: Hypothesis Testing: One Sample Instruction: Post your response first and then reply to two of your colleagues' posts. - Explain the difference between the z-test for mean using a P-Value and the z-test for mean using the rejection region(s).

See Solution

Problem 6273

Explain the conditions that are necessary to use the tt-test to test the difference between two population means.

See Solution

Problem 6274

Last month Maria hiked a total of 90 miles on two trails: a 5-mile mountain trail and a 10-mile canal trail. Let x represent the number of times Maria hiked the mountain trail, and let y represent the number of times Maria hiked the canal trail.
Which equation can be used to find the number of times Maria hiked each trail? x+y=90x+y=90 5x10y=905 x-10 y=90 9010y=5x90-10 y=5 x 90+10y=5x90+10 y=5 x

See Solution

Problem 6275

Using the following information:
1. The bank statement balance is $4,690\$ 4,690.
2. The cash account balance is $5,080\$ 5,080.
3. Outstanding checks amounted to $715\$ 715.
4. Deposits in transit are $1,020\$ 1,020.
5. The bank service charge is $40\$ 40.
6. A check for $72\$ 72 for supplies was recorded as $27\$ 27 in the ledger.

Prepare a bank reconciliation for Miller Co. for August 31. Miller Co. Bank Reconcillation August 31 Cash balance according to bank statement $\$ \square \checkmark \square \square \square
Adjusted balance \square Cash balance according to company's records \square \square \qquad $\$ \square \ \square \squareAdjustedbalance$ Adjusted balance \$ \square$

See Solution

Problem 6276

The length of a rectangle is 5 in . longer than its width. The diagonal is 5 in . shorter than twice the width. Find the length, width, and diagonal measures of the rectangle.
The measure of the length is \square \square width is \square \square and diagonal is \square \square

See Solution

Problem 6277

20 Celia and Anson had $2550\$ 2550 altogether. After Celia spent 35\frac{3}{5} of her money and Anson spent $730\$ 730, they had the same amount of money left. How much money did Anson have at first? \ \qquad$

See Solution

Problem 6278

Journalize the entries for the following transactions:
Mar. 1 Established a petty cash fund of $300\$ 300. 31 The amount of cash in the petty cash fund is now $64\$ 64. The fund is replenished based on the following receipts: office supplies, $137\$ 137; selling expenses, $112\$ 112.
Record any discrepancy in the cash short and over account. If an amount box does not require an entry, leave it blank. Mar. 1 \square \square \square \qquad \square \square
Mar. 31 \square \square \square \square \square \square \square \square \square \square \square \square

See Solution

Problem 6279

Write 5.25 as a fraction.

See Solution

Problem 6280

Write 0.09 as a fraction.

See Solution

Problem 6281

ICS 6B homework submissions are timestamped on submission up to an accuracy of 0.01 s . Consider the domain of all homework submissions over a relation RR where xRyx R y if yy is submitted before xx. It is possible that close to a deadline with an increase in the number of submissions per unit time the server notes multiple submissions to have been submitted on the same time. Check all that apply to RR and you ONLY need to explain which order it is (no need to justify for the other relation properties). \square Symmetric Transitive
Reflexive Anti-symmetric Not transitive
Anti-reflexive Neither Symmetric nor Anti-reflexive Anti-symmetric Partial Order Strict Order Total Order Explanation:

See Solution

Problem 6282

Question 5. A water tank A, has 225 litres of water in it. A Hose is attached to the tank and starts to pour in at 50 litres per minute. At the same time another tank B, which was empty starts filling at 75 litres per minute.
Find TT, the time it takes for the tanks to contain the same volume of water and VV, this same volume of water in each tank at this point. Enter your answers, to the nearest whole number, below T= minutes V= litres. \begin{array}{l} T=\square \text { minutes } \\ V=\square \text { litres. } \end{array}

See Solution

Problem 6283

Write 66266^{2} as a product of its prime factors in index form.

See Solution

Problem 6284

PROBLEM 9 Use your notes/slide from class to help you.
HOW MANY SIDES DOES EACH POIYGON HAVE? a] hepTAGON b] NONAGON C] 14-60N

See Solution

Problem 6285

What is the area of a parallelogram whose vertices are A(1,12),B(13,12),C(2,5)A(-1,12), B(13,12), C(2,-5), and D(12,5)D(-12,-5) ?
Enter your answer in the box. \square units 2^{2}

See Solution

Problem 6286

A small bottle weighs 20 gm when empty and 22 gm when filled with water. When it is filled with oil it weighs 21.76 gm . Then the density of the oil is (A) 0.88 g/cm30.88 \mathrm{~g} / \mathrm{cm}^{3} (B) 8.8 g/cm38.8 \mathrm{~g} / \mathrm{cm}^{3} (C) 6.8 g/cm36.8 \mathrm{~g} / \mathrm{cm}^{3} (D) 88.8 g/cm388.8 \mathrm{~g} / \mathrm{cm}^{3}

See Solution

Problem 6287

If the probability that Ahmad buys popcorn =0.4=0.4 And the probability that Ali buys popcorn if ahmad buys =0.7=0.7 And the probability that ali buys popcorn if ahmad doesn't buy=0.35 Find the probability that exactly one buys popcorn

See Solution

Problem 6288

If z=4(cos(π/6)+isin(π/6))z=4(\cos (\pi / 6)+i \sin (\pi / 6)) and w=2(cos(π/4)+isin(π/4))w=2(\cos (\pi / 4)+i \sin (\pi / 4)), what is the value of zz * w? a. 8(cos(π/3)+isin(π/3))8(\cos (\pi / 3)+i \sin (\pi / 3)) b. 8(cos(5π/12)+isin(5π/12))8(\cos (5 \pi / 12)+i \sin (5 \pi / 12)) c. 8(cos(π/2)+isin(π/2))8(\cos (\pi / 2)+i \sin (\pi / 2)) d. 8(cos(π)+isin(π))8(\cos (\pi)+i \sin (\pi))

See Solution

Problem 6289

Question 17, 7.1.18 Part 1 of 2 HW Score: 65.65\%, 15.1 of 23 poir Points: 0 of 1
A genetic experiment with peas resulted in one sample of offspring that consisted of 433 green peas and 163 yellow peas. a. Construct a 95%95 \% confidence interval to estimate of the percentage of yellow peas. b. Based on the confidence interval, do the results of the experiment appear to contradict the expectation that 25%25 \% of the offispring peas would be yellow? a. Construct a 95\% confidence interval. Express the percentages in decimal form. \square <p<<p< \square (Round to three decimal places as needed.)

See Solution

Problem 6290

XII. Харьцаа, пропори
19. Гурвалжны дотоод онцгҮүд 3:5:43: 5: 4 харьцаатай бол тус бүрийн хәмжәэг ол

See Solution

Problem 6291

авсан бэ? 21 Компани 80 сая төгрөгийн ашиттай ажиллажээ. Ашгаа гурван хөрөнге оруулагч нь анх оруулсан торөнгөт эйтоо пропорциопалаар хувааж авав. Арвин 20 сая. Баян 35 сая, Ашид 25 сая төгрөг хөрөнгө оруулсан бол тэд ашгаа хэрхэн хуваасан бэ?

See Solution

Problem 6292

:lRωc=20: \operatorname{lR} \omega_{c}=20 -II bR,αR(g(x)=x3+αx+bb \in \mathbb{R}, \alpha \in \mathbb{R}\left(g(x)=-x^{3}+\alpha x+b\right. A(0;2)A(0 ; 2) - (II DfD_{f} (6) (

See Solution

Problem 6293

A couple deposits $20,000\$ 20,000 into an account earning 7%7 \% annual interest for 20 years. Calculate the future value of the investment if the interest is compounded semiannually. Round your answer to the nearest cent.
Formulas Keypad

See Solution

Problem 6294

```latex \text{صورة النقطة } (3, -2) \text{ بالانسحاب 4 وحدات لليسار و 3 وحدات للأعلى هي النقطة:} ```

See Solution

Problem 6295

Question 2 (3 Points) Print the output of the following Verilog code ``` module tb(); int a,b,c,d,e; initial begin #100; display("a=display("a = %0d",a); display("b = %0d",b); display("c=display("c = %Od",c); display("d = %0d",d); $display("e = %Od",e); end ``` initial begin a='b011; b='b111; c='b100; d='b101; e='b001; a = b + c + d; b <= a + d + e; c = a + b + e; d <= b + c + e; e = c + d + a; a <= d + e + b; b = a + c + d; end endmodule

See Solution

Problem 6296

The roots of the equation ax2+bx+c=0a x^{2}+b x+c=0 are 12-\frac{1}{2} and 32-\frac{3}{2}. Find the values of a,ba, b and cc.
The interior angles of a polygon are: (2t+1),(3t2),(4t)(5t2),(2t1)(2 t+1)^{\circ},(3 t-2)^{\circ},(4 t)^{\circ}(5 t-2)^{\circ},(2 t-1)^{\circ} and (3t+2)(3 t+2)^{\circ}. Find the: (i) value of tt, (ii) difference between the largest and smallest angle.

See Solution

Problem 6297

Find the average rate of change of the function f(x)=x2+6xf(x)=x^{2}+6 x from x1=1x_{1}=1 to x2=2x_{2}=2.
The average rate of change is \square (Simplify your answer.)

See Solution

Problem 6298

A rectangle is constructed with sides of length 8.4×103 cm8.4 \times 10^{3} \mathrm{~cm} and 5.5×104 cm5.5 \times 10^{4} \mathrm{~cm}. (a) Write down the area of the rectangle in the form a×10ka \times 10^{k}, where 1a<101 \leq a<10 and kZk \in \mathbb{Z}.
Karen's estimate of the area of the rectangle is 450000000 cm2450000000 \mathrm{~cm}^{2}. (b) Find the percentage error in Karen's estimate.

See Solution

Problem 6299

c) Asrul memandu keretanya dengan kelajuan 120 km/j120 \mathrm{~km} / \mathrm{j}. Dia memperlahankan kelajuannya BAT sebanyak 30%30 \% daripada kelajuan asalnya dalam masa 15 saat. Hitung pecutannya, dalam km/j\mathrm{km} / \mathrm{j} per saat. Asrul drives his car with a speed of 120 km/h120 \mathrm{~km} / \mathrm{h}. He decreases his speed by 30%30 \% of his initial speed in 15 seconds. Calculate his acceleration, in km/h\mathrm{km} / \mathrm{h} per second. [3 markah/3 marks]
Jawapan/Answer:

See Solution

Problem 6300

Find the reference angle for 41π12\frac{41 \pi}{12}.

See Solution
banner

Start learning now

Download Studdy AI Tutor now. Learn with ease and get all help you need to be successful at school.

ParentsInfluencer programContactPolicyTerms
TwitterInstagramFacebookTikTokDiscord