Model

Problem 3201

Solve for the number: 5+x1=85 + \frac{x}{-1} = 8.

See Solution

Problem 3202

Dustin bought a bookcase for \170,whichis170, which is \frac{1}{5}oftheoriginalprice.Findtheoriginalprice of the original price. Find the original price p.Equation:. Equation: p=5×170p = 5 \times 170$

See Solution

Problem 3203

Translate the statement: Elana bought 6 notebooks, which is 3 more than textbooks. Find the number of textbooks tt.

See Solution

Problem 3204

View Cours *Lab1- Intr *Lab 2-Va Control St Online C Lab 3 - Ope Lab 4 - Con han\%20Zaza/Downloads/Lab\%202-\%20Variables.pdf T aあ Ask Copilot 4 of 4 २ CB GJ الجامعة الألمانية الأردنية German Jordanian Ưiversity V. Tasks
1. Write a program that accepts two integers from the user and calculate the product of the two integers
2. Write a C program to do the following: - Declare a variable called temperature in Fahrenheit (F). - Read the value of the temperature in Fahrenheit ( FF ) ifrom the keyboard. - Compute the temperature in Celsius based on the following formula: C=(F32)×5/9C=(F-32) \times 5 / 9 Search

See Solution

Problem 3205

Eighth grade 2.5 Graph a line using slope You have prizes to reveall go to yourgame board Learn with an example Watch a video (D) Questions answered
Graph the line that has a slope of 110\frac{1}{10} and includes the point (0,1)(0,1). 34
Click to select points on the graph. \begin{tabular}{|c|c|} \hline & Time tapsed \\ \hline 00 & 252925 \quad 29 \\ \hline \begin{tabular}{l} 3 m \\ out \end{tabular} & Martscore of 100 O \\ \hline \end{tabular} (0) Sulmiz

See Solution

Problem 3206

Write a quadratic equation in the form x2+bx+c=0x^{2}+b x+c=0 that has the following roots: Roots: 10±15-10 \pm \sqrt{15}
Answer Attempt 1 out of 2 Submit Answer

See Solution

Problem 3207

17. Use a graphing calculator to write an equation of the best fit line for the data. Round to the nearest hundredth. \begin{tabular}{|l|l|l|l|l|l|l|l|l|} \hlinexx & 2.2 & 2.5 & 2.8 & 3.5 & 5.1 & 6.3 & 8.5 & 9.6 \\ \hline y\boldsymbol{y} & 6.1 & 7.6 & 7.8 & 6.8 & 6.6 & 8.1 & 7.5 & 8.8 \\ \hline \end{tabular} y=y= \qquad x+x+ \qquad

See Solution

Problem 3208

1) Use the figure to answer the question.
Choose the correct equation to find the value of aa. mMLN=mMLKm \angle M L N=m \angle M L K mMLN+mMLK=90m \angle M L N+m \angle M L K=90^{\circ} mMLN=90+mMLKm \angle M L N=90^{\circ}+m \angle M L K mMLN+mMLK=180m \angle M L N+m \angle M L K=180^{\circ}
2) Use the figure to answer the question.
Using the equation from question 1, find the value of a. a=4.04a=4.04 a=31a=31 a=22.04a=22.04

See Solution

Problem 3209

e quadratic equation in the form x2+bx+c=0x^{2}+b x+c=0 that has the following roots: Roots: {7,5}\{7,-5\}
Answer Attempt 1 out of 2 Submit Answer

See Solution

Problem 3210

i 0 C.
The equation of Line AA is y=13x+4y=-\frac{1}{3} x+4. The graph of Line BB is parallel to Line AA and passes through the point (3,5)(3,5). Graph the two lines. A. B. D.

See Solution

Problem 3211

Save
For the following equation, (a) give a table with at least three ordered pairs that are solutions, and (b) graph the equation. y=x5y=|x-5| (a) Complete the following table. \begin{tabular}{|c|c|} \hlinexx & yy \\ \hline-5 & 10 \\ \hline 5 & 0 \\ \hline 13 & \\ \hline \end{tabular}

See Solution

Problem 3212

Help aidh parcon weach the destination by ploting the points and connecting them. 1) (5,9),(5,7),(6,7),(6,4),(6,1)(5,9),(5,7),(6,7),(6,4),(6,1) 2) (2,8),(2,6),(4,6),(4,2),(6,2)(2,8),(2,6),(4,6),(4,2),(6,2) 3) (10,3),(8,3),(8,6),(5,6),(5,8)(10,3),(8,3),(8,6),(5,6),(5,8) 4) (4,3),(6,3),(6,6),(8,6),(8,7)(4,3),(6,3),(6,6),(8,6),(8,7)

See Solution

Problem 3213

A graph GG is obtained from a graph of yy by the following sequence of transformations. Write an equation whose graph is GG. y=x2:y=x^{2}: a vertical stretch by a factor of 2, then a shift right 9 units
The equation whose graph is GG is \square (Type an equation.)

See Solution

Problem 3214

Write a proportion for each of the following. Do not solve.
5. If two identical tasks can be accomplished in 5 hr ., how many can be accomplished in 7 hre?
6. If three grain augers can be assembled in 5 hr ., how many can be assembled in an 8 hr . day?
7. If three pages were done in 5 min ., how many could be completed in 1 hr .?
8. If two barrels weighed 300 lb . together, how many barrels would it take to weigh 7,000lb.?7,000 \mathrm{lb} . ?
9. Logan gained 340 yd . in his first seven games. At that rate, how many games would it take him to reach a total of 1,000yd1,000 \mathrm{yd}. gained?
10. It took 40 lb , to reseed 5,000yd225,000 \mathrm{yd}^{2}{ }^{2}. How many yd. 2{ }^{2} could be reseeded with 225 lb .?
11. If a recipe calls for 1121 \frac{1}{2} cups of flour and makes 24 cookies, how many cups of flour will be needed to make 72 cookies?
12. Five yards of 72 in . fabric is needed to make three pairs of curtains. If eight pairs of curtains are needed, how many yards of fabric should be purchased?

See Solution

Problem 3215

Write the equation of this line in slope-intercept form. Submit

See Solution

Problem 3216

10. Rod says that he is thinking of two functions that have the following characteristics: a. One is rational, and has a yy-intercept at -2 b. One is trigonometric, and does not include the cosine function c. One contains the digit " 3 " and the other does not. d. Both have an instantaneous rate of change of 1.23 (rounded to two decimal places) at x=2x=2 e. The two functions intersect at x=2x=2
Provide one example of a pair of functions that meet Rod's criteria. Explain your thought process in making the functions, a screenshot, and calculations to verify each criterion. [7 marks]

See Solution

Problem 3217

Find the equation of the quadratic function ff whose graph is shown below. f(x)=f(x)= \square

See Solution

Problem 3218

Write the equation of this line in slope-intercept form.

See Solution

Problem 3219

In the game of roulette, a wheel consists of 38 slots numbered 0,00,1,2,,360,00,1,2, \ldots, 36. To play the game, a metal ball is spun around the wheel and is allowed to fall into one of the numbered slots. If the number of the slot the ball falls into matches the number you selected, you win $35\$ 35; otherwise you lose $1\$ 1. Complete parts (a) through ( g ) below. Click here to view the standard normal distribution table (page 1): Click here to view the standard normal distribution table (page 2). (a) Construct a probability distribution for the random variable XX, the winnings of each spin. (Type integers or decimals rounded to four decimal places as needed.)

See Solution

Problem 3220

Out of 160 workers surveyed at a company, 37 walk to work. a. What is the experimental probability that a randomly selected worker at that company walks to work? b. Predict about how many of the 4000 workers at the company walk to work. a. The experimental probability is \square

See Solution

Problem 3221

Write the equation of this ine in siope-intercept torm.

See Solution

Problem 3222

3. The table below shows the number of snacks still in the pantry as time goes on: \begin{tabular}{|l|c|c|c|c|} \hline \begin{tabular}{l} Days since \\ Store Trip \end{tabular} & 1 & 3 & 6 & 7 \\ \hline \begin{tabular}{l} Number of \\ Snacks \end{tabular} & 20 & 12 & 5 & 3 \\ \hline \end{tabular} a. Create a scatter plot for the data from the table: b. Draw a line of best fit. c. What association is depicted in the graph? \qquad d. Predict how many snacks were left by the 5th 5^{\text {th }} day. \qquad e. Predict how many snacks were left by the 10th 10^{\text {th }} day. \qquad .

See Solution

Problem 3223

\#5 Listen
Write a linear function ff with f(9)=10f(-9)=10 and f(1)=2f(-1)=-2. f(x)=f(x)= \square

See Solution

Problem 3224

5. Graph the compound inequality: \qquad L 2(0)+(6)<22y+x<2 and 95\begin{array}{cc} 2(0)+(6)<2 \\ 2 y+x<2 \end{array} \text { and } 9 \geq-5

See Solution

Problem 3225

Name: Date: \qquad \qquad Per: Unit 11: Sequences and Series \square Homework 3: Geometric Sequences \qquad This is a 2-page document! **
1. {18,108,648,3888,}\{18,-108,648,-3888, \ldots\}
2. {27,36,48,64,}\{27,36,48,64, \ldots\}
3. {10,4,85,1625,}\left\{10,4, \frac{8}{5}, \frac{16}{25}, \ldots\right\}

Directions: Write a rule for each sequence, then find the indicated term.
4. {3,9,27,81,};a\{-3,-9,-27,-81, \ldots\} ; a,
5. {18,27,812,2434,};a9\left\{-18,27,-\frac{81}{2}, \frac{243}{4}, \ldots\right\} ; a_{9}
6. {140,110,25,85,};a11\left\{\frac{1}{40},-\frac{1}{10}, \frac{2}{5},-\frac{8}{5}, \ldots\right\} ; a_{11}
7. {100,60,36,1085};a8\left\{100,60,36, \frac{108}{5} \ldots\right\} ; a_{8}

See Solution

Problem 3226

7. Create a Scatter Plot using information from the table. \begin{tabular}{|c|c|} \hline Hours & \# Sold \\ \hline 1 & 2 \\ \hline 2 & 3 \\ \hline 3 & 6 \\ \hline 3.5 & 7 \\ \hline 4 & 7 \\ \hline 4.25 & 8 \\ \hline 5 & 10 \\ \hline 5.25 & 10 \\ \hline 5.75 & 12 \\ \hline 6.5 & 14 \\ \hline \end{tabular}

See Solution

Problem 3227

3. A bus company has 4000 passengers daily, each paying a fare of $2\$ 2. For each $0.15\$ 0.15 increase in the fare, the company estimates that it will lose 40 passengers. If the company needs to take in (revenue) $10450\$ 10450 per day to stay in business, what fare should be charged?
4. Following its advertising campaign to double its toppings, Zittza Pizza decides to double the area of its 10 cm by 12 cm advertisement in the Woodbridge Times by adding the same length (number of centimeters) to both dimensions of the ad. What length must be added to each side? Give you answer correct to one decimal place? \qquad \qquad \qquad \qquad \qquad \qquad \qquad

See Solution

Problem 3228

9. Create a Scatter Plot using information from the table. \begin{tabular}{|c|c|} \hline Games & Homeruns \\ \hline 1 & 2 \\ \hline 2 & 3 \\ \hline 3 & 5 \\ \hline 3.5 & 6 \\ \hline 4 & 6 \\ \hline 4.5 & 7 \\ \hline 5 & 8 \\ \hline 5 & 6 \\ \hline 5.5 & 7 \\ \hline 6 & 8 \\ \hline \end{tabular}

See Solution

Problem 3229

2. [4 pts] In the diagram below, ABC\triangle A B C has coordinates A(1,1),B(4,1)A(1,1), B(4,1), and C(4,5)C(4,5). Graph and label ABC\triangle A^{\prime \prime} B^{\prime \prime} C^{\prime \prime}, the image of ABC\triangle A B C after the translation five units to the right and two units up followed by the reflection over the line y=0y=0. [Unit 2, Unit 5]

See Solution

Problem 3230

uation of the line tangent to the graph of y=5ln(x)y=5 \ln (x) at x=3x=3. y=y= \square Next item

See Solution

Problem 3231

Write the system of equations as an augmented matrix. {3d+3s6z=123d7s+3z=202d+3s5z=69\left\{\begin{array}{l} 3 d+3 s-6 z=-12 \\ 3 d-7 s+3 z=-20 \\ -2 d+3 s-5 z=-69 \end{array}\right. \square \square \square \square \square \square \square \square \square \square \square \square

See Solution

Problem 3232

Graph the folloing {y>x2y3x2\left\{\begin{array}{l} y>x-2 \\ y \leq 3 x-2 \end{array}\right.

See Solution

Problem 3233

Question 8 (1 point) Graph the function. f(x)=(14)xf(x)=\left(\frac{1}{4}\right) x

See Solution

Problem 3234

Find a formula for the inverse of the function f[1](Q)=f(x)=ln(5x+2).f^{[-1]}(Q)=\square \quad f(x)=\ln (5 x+2) .

See Solution

Problem 3235

Interactive Practice: Add with Negative Numbers
Find 323+(123)-3 \frac{2}{3}+\left(-1 \frac{2}{3}\right)
Model the expression on the number line.

See Solution

Problem 3236

At a jazz club, the cost of an evening is based on a cover charge of $30\$ 30 plus a beverage charge of $5\$ 5 per drink. (a) Find a formula for t(x)t(x), the total cost for an evening in which xx drinks are consumed. t(x)=5x+30t(x)=5 x+30 (b) If the price of the cover charge is raised by $5\$ 5, express the new total cost function, n(x)n(x), as a transformation of t(x)t(x). n(x)=t(x)+5n(x)=t(x)+5
Note: Do not give an explicit formula. Using function notation, write an expression for n(x)n(x) by performing the necessary transformations to t(x)t(x). For example your answer should be of the form, n(x)=t(x100)+180n(x)=t(x-100)+180 and not of the form n(x)=80x+9n(x)=80 x+9. (c) The management increases the cover charge to $35\$ 35, leaves the price of a drink at $5\$ 5, but includes the first two drinks for free. For x2x \geq 2, express p(x)p(x), the new total cost, as a transformation of t(x)t(x). p(x)=p(x)=\square (see note in (b) above for the correct way to express your answer)

See Solution

Problem 3237

7. This exercise is about the simultaneous equations x+3y=3x+y=5\begin{array}{c} x+3 y=3 \\ x+y=5 \end{array} a) Graph the two equations on one pair of axes.

See Solution

Problem 3238

Problem situation: Amy's cable company charges her a $75\$ 75 installation fee and $89\$ 89 per month for cable services. She has had cable services for 10 months. How much has she paid in total for cable services? Select the equation that represents this situation. The letter cc represents the total cost of cable. CLEAR CHECK 89+10+75=c89×10×75=c89×10+75=c(89+75)×10=c\begin{array}{ll} 89+10+75=c \\ 89 \times 10 \times 75=c \\ 89 \times 10+75=c & (89+75) \times 10=c \end{array}

See Solution

Problem 3239

Problem Situation: Gabi buys tickets to the movies. She buys 1 adult ticket for $14\$ 14 and 3 youth tickets. She pays a total of $35\$ 35. What is the cost of each youth ticket?
Complete the equation to represent this situation. The letter tt represents the cost of a youth ticket.

See Solution

Problem 3240

10. Rod says that he is thinking of two functions that have the following characteristics: a. One is rational, and has a yy-intercept at -2 b. One is trigonometric, and does not include the cosine function c. One contains the digit " 3 " and the other does not. d. Both have an instantaneous rate of change of 1.23 (rounded to two decimal places) at x=2x=2 e. The two functions intersect at x=2x=2
Provide one example of a pair of functions that meet Rod's criteria. Explain your thought process in making the functions, a screenshot, and calculations to verify each criterion. [7 marks]

See Solution

Problem 3241

22. Sketch a function that has the following properties: f(0)=0,f(2)=0f^{\prime}(0)=0, f^{\prime}(2)=0 f(x)>0f^{\prime \prime}(x)>0 on the interval (1,3)(1,3) f(x)<0f^{\prime \prime}(x)<0 on the intervals (2,1)(-2,1) and (3,)(3, \infty) limxf(x)=4limxf(x)=5limx2f(x)=\begin{array}{l} \lim _{x \rightarrow-\infty} f(x)=4 \\ \lim _{x \rightarrow \infty} f(x)=5 \\ \lim _{x \rightarrow-2} f(x)=-\infty \end{array}

See Solution

Problem 3242

The center of a wind turbine is attached to the top of a 60 m tower and it has four spinning blades that are 40 m long. The turbine makes 40 revolutions (counterclockwise) every minute. We're trying to track the motion of a particular blade. The blade starts at an angle of π4\frac{\pi}{4} with the horizontal. Find a function HH such that tt minutes after the turbine starts turning the tip of this particular blade is at a height of H(t)H(t) feet. H(t)=H(t)= \qquad

See Solution

Problem 3243

Substitute the value of a to find the equation of the given graph. f(x)=(x+4)2+3f(x)=-(x+4)^{2}+3

See Solution

Problem 3244

C RM, 15. Point PP is on the terminal arm of an angle in standard position in us Quadrant 1. The distance rr between PP and the origin is given. Determine possible coordinates for PP. a) 29\sqrt{29}

See Solution

Problem 3245

Question 22 - of 48 Step 1 of 1 Write the following logarithmic equation as an exponential equation. Do not simplify your answer. 2x=logc( V)2 \mathrm{x}=\log _{\mathrm{c}}(\mathrm{~V})
Answer 2 Points

See Solution

Problem 3246

8. A contestant on a game show spins a wheel that is located ona plane perpendicular to the floor. He grabs the only red peg ons the circumference of the wheel, which is 1.5 m above the floor, and pushes it downward. The red peg reaches a minimum height of 0.25 m above the floor and a maximum height of 2.75 m above the floor. Sketch two cycles of the graph that represents the height of the red peg above the floor, as a function of the total distance it moved. Then determine the equation of the sine function that describes the graph.

See Solution

Problem 3247

Find 1423-1-4 \frac{2}{3}
Model the expression on the number line. \square \vdash \rightarrow

See Solution

Problem 3248

Convert the following equation to polar coordinates. y=4x2y=4 x^{2}
The polar form of y=4x2y=4 x^{2} is \square (Type an exact answer.)

See Solution

Problem 3249

Consider the following integral. t6et7dt\int t^{6} e^{-t^{7}} d t
Find a substitution to rewrite the integrand as 17eudu-\frac{1}{7} e^{u} d u. u=t7du=()dt\begin{aligned} u & =\boxed{-t^{7}} \\ d u & =(\square) d t \end{aligned}
Evaluate the given integral. (Use CC for the constant of integration.) \square Remember to use capital C.

See Solution

Problem 3250

Graph the inequality 4x5y>204 x-5 y>20.

See Solution

Problem 3251

Question 4
Write an equation for the transformed logarithm shown below, that passes through (2,0)(2,0) and (1(1, f(x)=f(x)= \square Question Help: Video 1 Video 2 Video 3 Message instructor Submit Question

See Solution

Problem 3252

Wodurch ist eine Ebene festgelegt? - Auftrag 3 Eine Ebene kann nicht nur durch drei geeignete Punkte festgelegt werden, sondern auch durch zwei Geraden. a). Begründe: Zwei verschiedene, zueinander parallele Geraden legen eine Ebene fest.
Im Folgenden sind zwei Geraden gegeben: g:x=(321)+t(100)h:x=(010)+s(100)g: \vec{x}=\left(\begin{array}{l} 3 \\ 2 \\ 1 \end{array}\right)+t \cdot\left(\begin{array}{l} 1 \\ 0 \\ 0 \end{array}\right) \quad h: \vec{x}=\left(\begin{array}{l} 0 \\ 1 \\ 0 \end{array}\right)+s \cdot\left(\begin{array}{l} 1 \\ 0 \\ 0 \end{array}\right) b) Diese zwei verschiedenen, parallelen Geraden legen eine Ebene fest. Bestimmen eine Parametergleichung der Ebene.

See Solution

Problem 3253

7. (0-2) Podstawą prostopadłościanu jest kwadrat o boku x, a jego krawędź boczna jest o 2 krótsza od krawędzi podstawy. Wyznacz wielomian V opisujący objętość tego prostopadłościanu. Określ dziedzinę funkcji. 142-7

See Solution

Problem 3254

Graph each system of inequalities. Shade the solution of each system. 1.) {y2x1y>x+3\left\{\begin{array}{l}y \leq 2 x-1 \\ y>-x+3\end{array}\right. 2.) {3x2y<42x6y<12\left\{\begin{array}{l}3 x-2 y<4 \\ -2 x-6 y<-12\end{array}\right. 3.) {2x+2y6x+y1\left\{\begin{array}{l}2 x+2 y \geq-6 \\ x+y \leq-1\end{array}\right.

See Solution

Problem 3255

2. Дан треугольник ABC:A(2;3),B(6;5),C(0;0)A B C: A(2 ; 3), B(6 ;-5), C(0 ; 0). Составьте уравнение средней линии MNM N, где MM и NN - середины сторон ABA B и BCB C соответственно.
3. Для данной системы векторов

See Solution

Problem 3256

Find an equation of the line through (3,7)(3,7) and parallel to y=4x2y=4 x-2. Write the equation using function notation. f(x)=f(x)=

See Solution

Problem 3257

and moon seen by Galileo Spacecraft. Image credit: NASA
Complete the following equation to determine the force that Earth and the moon exert on each other: F=F= \square ×\times \square ×m2\times \mathrm{m}_{2} \square 2=2= \square F
Where m2\mathrm{m}_{2} is the mass of Earth.
Use what you know about calculating gravitational potential energy to correctly set up and solve the equation. Save Submit

See Solution

Problem 3258

Express the following equations in logarithmic form: (a) 44=2564^{4}=256 is equivalent to the logarithmic equation: \square (b) 104=0.000110^{-4}=0.0001 is equivalent to the logarithmic equation: \square

See Solution

Problem 3259

Exemple 3: Ėve fait voler un cerf-volant qui est fixé au bout d'une corde de 50 m . Le soleil se trouve directement au-dessus de sa tête et la corde crée un angle de π/6\pi / 6 par rapport au sol. Le vent souffle plus fort et le cerfvolant s'élève jusqu'à ce que la corde forme un angle de π/3\pi / 3 par rapport au sol. Détermine l'expression en valeur exacte qui définit la distance parcourue par l'ombre du cerf-volant entre les deux positions.

See Solution

Problem 3260

If a student scores 78%,74%78 \%, 74 \%, and 75%75 \% on their first 3 exams, what would they need to score on their 4th exam in order to have an exam average of exactly 80\%?
Select one: a. 93%93 \% b. 97%97 \% c. 95%95 \% d. 90%90 \% e. none of these f. IDon't Know

See Solution

Problem 3261

Question 1 (1 point) Write the equation to the line that has these features: Slope =6=6 yy-intercept = -2

See Solution

Problem 3262

Exercises:
1. A homeowner wants to fence off a rectangular garden plot next to the street. The fend along the street costs $14\$ 14 per meter. The fencing along the other three sides costs $10\$ 10 pe meter. The total amount of money available for fencing material is $240\$ 240. Find the dime of the garden of maximum area.
2. A rancher plans to enclose a rectangular field next to a road (there will be no fence alo

See Solution

Problem 3263

y=x+3y=-x+3 b=3b=3
Use the given information to write the equation of each line in the form y=mx+by=m x+b. slope =3=-3 and yy-intercept =4=4 b.) m=5m=-5 and b=0b=0 y=4y=4- parallel to y=6x1y=6 x-1 and yy-intercept =3=-3

See Solution

Problem 3264

According to TrueCar.com, the July 2016 market average price for a 2013 Honda Civic Coupe in Bellflower, CA was xˉ=$14,995\bar{x}=\$ 14,995. Suppose that the standard deviation for the price was s=$1,116s=\$ 1,116, based on a sample of 144 cars. a. Construct and interpret a 90\% confidence interval for the market average price for all 2013 Honda Civic Coupes in Bellflower, CA. Use PMACC.

See Solution

Problem 3265

the ExpertTA.com Student: cristian.alvarez@ctstate.edu My Account Class Management I Help EXPERT Problem Status
HW7 Angular Motion Begin Date: 11/4/2024 12:01:00 AM Due Date: 11/22/2024 11:59:00 PM End Date: 12/13/2024 11:59:00 PM Problem 4: ( 25%25 \% of Assignment Value) A bowling ball of mass m=2.4 kgm=2.4 \mathrm{~kg} drops from a height h=14.4 mh=14.4 \mathrm{~m}. A semi-circular tube of radius r=6.2 mr=6.2 \mathrm{~m} rests centered on a scale. Alvarez, Cristian - cristian.alvarez@ctstate.edu @theexpertta.com - tracking id: 8C84-EB-49-43-A913-26821. In accordance with Expert TA's Terms of Service, copying this information to any solutions sharing website is strictly forbidden. Doing so may result in termination of your Expert TA Account. Ctheexpertta.com
Part (a) Write an expression for the reading of the scale when the bowling ball is at its lowest point, in terms of the variables in the problem statement and gg. W=W= \square g 7 8 9 HOME 4 5 6 \square 1 2 3 \square 0 . END Grade Summary Deductions Potential Late Work \% Late Potential 10%%10 \% \% 100%100 \% 78%78 \% 78%78 \% 78%\mathbf{7 8 \%} h m Submissions Attempt(s) Remaining: 5%5 \% Deduction per Attempt detailed view r - backspace DiE clear

See Solution

Problem 3266

7. Students measured the diameter of many different plastic rings found in a teacher's classroom. The distribution of their measurements (M)(M) is roughly symmetric, with a mean of 21.3 cm and a standard deviation of 1.88 cm .
The teacher quickly realized that her students were measuring in millimeters and not centimeters. Additionally, they measured from the end of the ruler which was 0.5 centimeters from the mark for zero centimeters. To adjust for these errors, the teacher transforms the distribution using the following expression: M100.5\frac{M}{10}-0.5

See Solution

Problem 3267

Two divers were exploring a new territory. Diver 1 started at 18 * 2 points meters above sea level and was descending at a rate of 3 meters per minute. Diver 2 started 2 meters below sea level and was ascending 2 meters per minute. When will the divers be at the same height? Let xx represent minutes and yy represent meters traveled.
What equation represents Diver 1? y=18x+3y=18 x+3 y=3x+18y=-3 x+18 y=3x+18y=3 x+18

See Solution

Problem 3268

Jse the information below to write 0.48˙1˙0.4 \dot{8} \dot{1} as a fraction in its simplest form. 0.48˙i˙=0.4+0.08˙1˙0.08˙i˙=9110\begin{array}{c} 0.4 \dot{8} \dot{i}=0.4+0.0 \dot{8} \dot{1} \\ 0.0 \dot{8} \dot{i}=\frac{9}{110} \end{array}

See Solution

Problem 3269

Fill in each blank to construct an ϵδ\epsilon-\delta proof showing that limx71x=6\lim _{x \rightarrow 7} 1-x=-6
Where it asks for δ\delta give the largest value that will work. Proof. Let ? >0\quad \checkmark>0 be given. Let δ\delta be the product δ=(\delta=( \square ) (ϵ)(\epsilon)
If | xx- \square 1<?1<? \square then after some algebra we arrive at (1x)\mid(1-x)- \square 1<1< ? which is what we wanted to prove. Note: You can eam partial credit on this problem.

See Solution

Problem 3270

\begin{align*} \text{(b) Write a piecewise defined function to describe the usage rate.} \\ \text{NOTE: Enter the exact answer in dollars, or round to three decimal places.} \\ C(n) = \begin{cases} \square & \text{for } 0 \leq n \leq 16 \\ \square & \text{for } n > 16 \end{cases} \\ \text{(c) What is the cost for 31 kWh?} \\ \text{NOTE: Round your answer to two decimal places.} \\ \text{The cost of 31 kWh is } \$3.35 \\ \text{(d) How many kWh can you burn on a day for } \$4? \\ \text{NOTE: Round your answer to three decimal places.} \\ \text{You can burn } 35.937 \text{ kWh on a day for } \$4. \\ \text{The user took a picture with their phone and the text was extracted above. The user then had a dialogue with an AI Assistant to help clarify the instructions.} \\ \text{Dialogue Transcript:} \\ \text{Assistant:} \\ \text{Hi there! It looks like you're working on a problem related to piecewise functions and cost calculations for electricity usage. However, to help you complete part (b) where a piecewise function needs to be defined, I need more information about the rates for electricity usage for both when } 0 \leq n \leq 16 \text{ and when } n > 16. \\ \text{Could you provide the specific cost rates or any details about the pricing structure?} \\ \text{Once I have that information, I'll be able to assist you further.} \\ \text{User:} \\ \text{kWh: 0, 5, 10, 15, 20, 25, 30, 35, 40 cost in dollars: 0.17, 0.54, 0.93, 1.31, 2.31, 2.96, 3.61, 4.26, 4.91} \end{align*}

See Solution

Problem 3271

Give the equation of the circle centered at the origin and passing through the point (0,9)(0,-9).

See Solution

Problem 3272

Find an equation of the circle whose diameter has endpoints (5,4)(-5,-4) and (5,6)(5,6). \square

See Solution

Problem 3273

2. Find a second order homogenous linear ODE in standard form for which a basis of the solution is cos5x,sin5x\cos 5 x, \sin 5 x
Show linear independence by the Wronskian. Solve the initial value problem with initial conditions y(0)=3,y(0)=5.y(0)=3, y^{\prime}(0)=-5 .

See Solution

Problem 3274

Graph the function. f(x)=x36f(x)=\sqrt[3]{x}-6
Plot five points on the graph of tliz function, as follows. - Plot the first point using the xx-value that satisfies x3=0\sqrt[3]{x}=0. - Plot two points to the left and two points to the right of the first point.
Then click on the graph-a-function button.

See Solution

Problem 3275

49) Write equation of a line which passes through (27,12)(27,12) and parallel to y=2016y=2016.

See Solution

Problem 3276

Write a balanced nuclear equation for the following: The nuclide bismuth-214 undergoes alpha emission. Not submitted

See Solution

Problem 3277

50) Write equation of a line which passes through (2,5)(2,5) and perpendicular to y=xy=x

See Solution

Problem 3278

30. Let A={(1,2,3),(2,1,0),(4,5,0)},B={(2,1,2),(3,1,2),(2,1,3)}\mathcal{A}=\{(1,2,3),(2,1,0),(4,5,0)\}, \mathcal{B}=\{(2,1,2),(3,1,2),(2,1,3)\}. Find a matrix CM3×3(R)C \in M_{3 \times 3}(\mathbb{R}), fulfilling the following condition. For a given vector αR3\alpha \in \mathbb{R}^{3} : if the coordinates of α\alpha in the basis A\mathcal{A} are x1,x2,x3x_{1}, x_{2}, x_{3} and the coordinates of α\alpha in the basis B\mathcal{B} are y1,y2,y3y_{1}, y_{2}, y_{3}, then C[x1x2x3]=[y1y2y3].C \cdot\left[\begin{array}{l} x_{1} \\ x_{2} \\ x_{3} \end{array}\right]=\left[\begin{array}{l} y_{1} \\ y_{2} \\ y_{3} \end{array}\right] .

See Solution

Problem 3279

52) Write equation of a line which passes through (5,3)(5,3) and perpendicular to x=13yx=\frac{1}{3} y.

See Solution

Problem 3280

The graph shows g(x)g(x), which is a translation of f(x)=x2f(x)=x^{2}. Write the function rule for g(x)g(x)
Write your answer in the form a(xh)2+k\mathrm{a}(\mathrm{x}-\mathrm{h})^{2}+\mathrm{k}, where a,h\mathrm{a}, \mathrm{h}, and k are integers or simplified fractions.

See Solution

Problem 3281

15) Given a parabola has a vertex at (2,16)(-2,16) and a point at (3,9)(3,-9) a) Write the equation in vertex form b) Write the equation in standard form c) Write the equation in intercept form

See Solution

Problem 3282

Find the equation of the tangentizine at the given poin 7. x2y2=27x^{2}-y^{2}=27 at (6,3)(6,-3)

See Solution

Problem 3283

A sign shows that the distance to Las Vegas is 22 miles. A traveler wants to know what this distance is in kilometers. Help the traveler by completing the parts below. (a) Let xx be the unknown number of kilometers. Using the values below, create a proportion that can be used to find xx. Use the conversion 1 mile =1.6=1.6 kilometers.
Values: \square 1 \square \square \square \square \square \square (b) Use the proportion from part (a) to find the distance to Las Vegas in kilometers. Do not round any computations. \square kilomete

See Solution

Problem 3284

Convert the complex number to polar form: 44i4-4 i

See Solution

Problem 3285

Use a system of linear equations to solve the following problem. A new restaurant is to contain two-seat tables and four-seat tables. Fire codes limit the restaurant's maximum occupancy to 58 customers. If the owners have hired enough servers to handle 18 tables of customers, how many of each kind of table should they purchase?
Write a system of linear equations using the given information. Choose correct answer below. A. {xy=582x4y=18\left\{\begin{array}{l}x-y=58 \\ 2 x-4 y=18\end{array}\right. B. {2x+4y=58x+y=18\left\{\begin{array}{l}2 x+4 y=58 \\ x+y=18\end{array}\right. C. {2x4y=58xy=18\left\{\begin{array}{l}2 x-4 y=58 \\ x-y=18\end{array}\right. D. {x+y=582x+4y=18\left\{\begin{array}{l}x+y=58 \\ 2 x+4 y=18\end{array}\right.
They should purchase \square two-seat tables and \square four-seat tables.

See Solution

Problem 3286

Create four (4) problems that include fractions. Solve the probl using estimation.
Each problem must contain: - at least three (3) fractions - two (2) must include the addition of fractions - two (2) must include subtraction of fractions. - an explanation of your reasoning process for each problem

See Solution

Problem 3287

Use transformations to graph the function. q(x)=(x+2)2+5q(x)=-(x+2)^{2}+5

See Solution

Problem 3288

A number, vv, is decreased by 10 and the result is then multiplied by 3 . The final result is greater than the original number.
Write and solve an inequality to show the possible values that vv could take.

See Solution

Problem 3289

(6) i sample of gas occupies a volume of 2.00 L when the pressure is 2.00 atm . If the pressure is changed to 1.50 atm. what volume will the gas occupy. assuming that there is no change in the temperature?
6. \qquad A : Baries

See Solution

Problem 3290

Drag the red and blue dots along the x -axis and y -axis to graph 3x+3y=18-3 x+3 y=18.

See Solution

Problem 3291

Convert to millimeters.
Try using the metric prefix conversion chart: METRIC CONVERSION CHART Length/Capacity/Weight(Mass) Toce nerit to a smaller unit, maltipyly meving the decimel point to the right. Largerturit ×10×10×10×10×10\times 10 \times 10 \times 10 \times 10 \times 10 smillestemt \begin{tabular}{|c|c|c|c|c|c|c|} \hline King & Henry & Died & By & Drinking & Chocolate & Mik \\ \hline Kilo & Hecto & Deka & \begin{tabular}{l} BASE \\ Meter \\ Uter \\ Gram \end{tabular} & Deci & Centi & Mili \\ \hline & & &  whent  remic \begin{array}{l} \hline \text { whent } \\ \text { remic } \\ \hline \end{array} & & & \\ \hline \end{tabular}
Meter: Iength/distance Liter: capacity Grami weqht(mass)
100 meters == \square millimeters

See Solution

Problem 3292

For 1-12, create the slope intercept form (y=mx+b)(y=m x+b) based on the given information. 1) Slope =1,b=5=1, b=-5 2) Slope =12,y=-\frac{1}{2}, y-intercept =3=3

See Solution

Problem 3293

Drag the red and blue dots along the x -axis and y -axis to graph 2x+2y=18-2 x+2 y=18.

See Solution

Problem 3294

\begin{tabular}{|c|c|c|} \hline \multicolumn{3}{|l|}{\begin{tabular}{l|l}
1. Factual Recall & 2. Carry out a Procedure \end{tabular}} \\ \hline \multicolumn{2}{|l|}{The function ff is logarithmic. The table shows output values over equal-length output value intervals. Complete the input values of the table.} & \multirow[t]{7}{*}{A logarithmic function has the form of g(x)=alogbxg(x)=a \cdot \log _{b} x, where a>1a>1 and bb is the base. Use the table in \#1 to find aa and bb.} \\ \hline x & f(x)f(x) & \\ \hline 1/9 & -4 & \\ \hline 1/3 & -2 & \\ \hline 0 & 0 & \\ \hline 2 & 2 & \\ \hline 4 & 4 & \\ \hline \end{tabular}

See Solution

Problem 3295

Question Watch Video Show Examples
Write the equation of the line that passes through the points (0,9)(0,9) and (0,7)(0,7). Put your answer in fully simplified point-slope form, unless it is a vertical or horizontal line. Answer Attempt 1 out of 2

See Solution

Problem 3296

AISA 5 to the 8th power - Start Page
Jaxon has two bins. The bins are shaped like cubes with the dimensions shown.
Write an algebraic expression that Jaxon can use to find the total volume, in cubic inches, of the two bins for any value of xx.
Then find the total volume of the bins when x=4x=4.
Use the number pad and xx to enter your answers in the boxes.
Algebraic Expression: 125+x3125+x^{3}
Total Volume when x=4:189x=4: 189

See Solution

Problem 3297

2.6cm 3.2cm 41 cm bxh As

See Solution

Problem 3298

Fill in the left side of this equilibrium constant equation for the reaction of carbonic acid (H2CO3)\left(\mathrm{H}_{2} \mathrm{CO}_{3}\right) with water. Π=Ka\Pi=K_{\mathrm{a}}

See Solution

Problem 3299

The following table represents an exponential function. \begin{tabular}{|c|c|} \hlinexx & yy \\ \hline 0 & 4 \\ \hline 1 & 2 \\ \hline 2 & 1 \\ \hline 3 & 12\frac{1}{2} \\ \hline 4 & 14\frac{1}{4} \\ \hline \end{tabular}
The exponential function represented by the table can be written in the form y=abxy=a b^{x}. Find the values for aa and bb. a=a=\square b=b= \square

See Solution

Problem 3300

Consider the following system of equations. 2x+3y=223x+5y=35\begin{array}{l} 2 x+3 y=22 \\ 3 x+5 y=35 \end{array} (a) Write a matrix equation that is equivalent to the system of linear equat [2335][xy]=[2235]\left[\begin{array}{ll} 2 & 3 \\ 3 & 5 \end{array}\right]\left[\begin{array}{l} x \\ y \end{array}\right]=\left[\begin{array}{l} 22 \\ 35 \end{array}\right] (b) Solve the system using the inverse of the coefficient matrix. (x,y)=()(x, y)=(\square) Need Help? Read It Watch it

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