Math

Problem 64901

Rewrite the improper fraction 207\frac{20}{7} as a mixed number after calculating 20747\frac{20}{7} \cdot \frac{4}{7}.

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Problem 64902

56. Find the annual salary of the Governor of Tennessee if it's \$94,000 less than New York's \$179,000.
57. Determine the starting temperature if it dropped 21 degrees to reach -9°C.
58. If Rolling Hills Farm is 126 acres, find the total acres of Briarwood Farm, which is 4 times larger.

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Problem 64903

Factor the quadratic equation 3p2+32p+203p^{2}+32p+20.

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Problem 64904

Find the focal length ff using f=abb+af=\frac{a b}{b+a} for a=12a=12 cm and b=7b=7 cm. Round to the nearest tenth. Options: A. 3.53.5 cm B. 7.67.6 cm C. 6.06.0 cm D. 4.44.4 cm

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Problem 64905

Solve for the number of players in a league: 6 times a number equals 132. What is the number?

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Problem 64906

Divide 1341 \frac{3}{4} by 3233 \frac{2}{3}.

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Problem 64907

Find the values that make the expression 3y5y236\frac{3 y-5}{y^{2}-36} undefined. Choose from: A. y=6,y=6y=6, y=-6 B. y=36y=36 C. y=6y=6 D. y=53y=\frac{5}{3}

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Problem 64908

The Lopez family drove 210 miles to Nashville and 390 miles total. Find the distance to Knoxville and the property of equality used.

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Problem 64909

Find the limit: limx6x5xx4+3\lim _{x \rightarrow-\infty} \frac{6 x^{5}-x}{x^{4}+3}.

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Problem 64910

A car on a 2.62.6^{\circ} uphill grade has a resistance of 112lb112 \mathrm{lb}. Find the car's weight to the nearest hundred pounds.

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Problem 64911

Simplify the expression: 18k36k\frac{18 k^{3}}{6 k}. What is the result? A. 3k23 k^{2} B. 12k212 k^{2} C. 12 D. 3k3 k

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Problem 64912

1. Solve 34y=820-\frac{3}{4} y=\frac{8}{20} for yy.
2. The Lopez family drove 210 miles to Nashville and 390 miles total. Find the distance from Nashville to Knoxville.
3. Explain a property of equality to isolate the variable.
4. How far is Knoxville from Nashville, and how can you verify your answer?
5. If they drive 47 miles less to Chattanooga, write an equation for the distance from Memphis to Chattanooga. How far is Chattanooga from Nashville?

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Problem 64913

Divide 1341 \frac{3}{4} by 3233 \frac{2}{3}.

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Problem 64914

A car on a 1.71.7^{\circ} incline has a grade resistance of 123lb123 \, \mathrm{lb}. Find the car's weight in hundreds using: Grade Resistance = Weight * sin(incline). Consider other forces too.

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Problem 64915

Simplify the expression: a2ab+9a9ba+9\frac{a^{2}-ab+9a-9b}{a+9}. Use grouping to factor the numerator.

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Problem 64916

Relationship A pays more than Relationship B. Given B's data, which equation for A is correct? y=15.4xy=15.4 x, y=149xy=149 x, y=15.2xy=15.2 x, y=16.4xy=16.4 x?

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Problem 64917

Graph the inequality x1x \leq -1 or x>2x > 2 on a number line.

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Problem 64918

Simplify the expression: 10x10yx+y\frac{-10 x-10 y}{x+y}. Choose the correct option: A. 110\frac{1}{10} B. -10 C. 110-\frac{1}{10} D. 10

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Problem 64919

Find the grade resistance for a 2100-pound car on a 0.50.5^{\circ} uphill grade using F=WsinθF=W \sin \theta. Round to the nearest pound.

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Problem 64920

Evaluate sin2(28)+cos2(28)\sin^{2}(28^{\circ}) + \cos^{2}(28^{\circ}) and simplify your answer to find the value.

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Problem 64921

Evaluate: sin16448cos1512+cos16448sin1512\sin 164^{\circ} 48^{\prime} \cos 15^{\circ} 12^{\prime} + \cos 164^{\circ} 48^{\prime} \sin 15^{\circ} 12^{\prime}. Round to four decimal places.

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Problem 64922

What grade does Jenny need on her third History test to average 80 if she scored 70 on the first two tests?

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Problem 64923

Write three more Count on facts similar to 36+136+1 and 7+27+2.

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Problem 64924

Evaluate sin306cos36cos306sin36\sin 306^{\circ} \cos 36^{\circ} - \cos 306^{\circ} \sin 36^{\circ} using a calculator. Provide a simplified answer.

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Problem 64925

Simplify sin306cos36cos306sin36=\sin 306^{\circ} \cos 36^{\circ}-\cos 306^{\circ} \sin 36^{\circ}= (integer or fraction).

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Problem 64926

Find α\alpha in [0,90][0^{\circ}, 90^{\circ}] such that secα=1.1556371\sec \alpha = 1.1556371.

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Problem 64927

Find xx for the function f(x)=9exex2f(x)=\frac{9 e^{x}}{e^{x}-2} where ex2=0e^{x}-2=0.

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Problem 64928

Compare these numbers using < or >: 146\sqrt{146}, 137\sqrt{137}, 11.6811.68, 172/317^{2 / 3}, 21/221 / 2, 9.719.71.

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Problem 64929

Given two figures, Figure 1 and Figure 2, where Figure 2 is a scaled copy of Figure 1:
a. Find points PP and RR in Figure 2 corresponding to AA and CC in Figure 1, with distance PP to RR as 6 units.
b. Find points BB and DD in Figure 1 corresponding to QQ and SS in Figure 2.
c. Calculate the scale factor from Figure 1 to Figure 2.
d. If distance between GG and HH in Figure 1 is 1 unit, find the distance between corresponding points in Figure 2. Distance between AA and CC in Figure 1 is 2 units.

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Problem 64930

Find two equivalent ratios of cups of pink paint to cups of blue paint for the ratio 6 to 5.

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Problem 64931

Find the decimal approximation of cot(26023)\cot \left(-260^{\circ} 23^{\prime}\right) rounded to seven decimal places.

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Problem 64932

Find θ\theta in [0,90][0^{\circ}, 90^{\circ}] such that sinθ=0.65303571\sin \theta = 0.65303571. What is θ\theta \approx? Round to six decimal places.

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Problem 64933

Determine the consecutive whole numbers between which 76\sqrt{76} falls.

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Problem 64934

Find how many seconds it takes for a device releasing gas at 0.251 liter\frac{0.25}{1 \text{ liter}} to produce 154 grams.

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Problem 64935

Select correct subsets for the number 17-17: a Real, b Natural, c Whole, d Rational, e Integer.

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Problem 64936

Find the residual for a 29 g chick from an egg with a breadth of 40 mm using the equation y^=47+2x\hat{y}=-47+2x.

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Problem 64937

Simplify the expression: 3x3y3y3x\frac{3 x-3 y}{3 y-3 x}. Choose A. 1, B. -3, C. 3, or D. -1.

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Problem 64938

Find the angle of elevation of the sun for a 64.38 ft tall building with a 69.19 ft shadow. Round to the nearest hundredth.

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Problem 64939

Complete the unit conversions for problems 1-11, rounding to the nearest hundredth if needed. 12: How far can Miss Baker walk in an hour?

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Problem 64940

Simplify the product: x2+x28x+1\frac{x^{2}+x}{2} \cdot \frac{8}{x+1}. Select the correct answer.

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Problem 64941

A lab device releases gas at a rate of 0.25second\frac{0.25}{\text{second}}. With a density of 4.3 grams1 liter\frac{4.3 \text{ grams}}{1 \text{ liter}}, find the time to release 154 grams.

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Problem 64942

Find the product and simplify: z340z52z2\frac{z^{3}}{40 z} \cdot \frac{5}{2 z^{2}}. Options: A. 116z\frac{1}{16 z} B. z16\frac{z}{16} C. 116\frac{1}{16} D. z316z2\frac{z^{3}}{16 z^{2}}

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Problem 64943

Find the bearing of an airplane at (12,0)(12,0) from the origin. Provide the bearing as a single angle measure.

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Problem 64944

Find the slope of the line given by the equation 12x3y=2112 x - 3 y = -21.

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Problem 64945

Identify the adjectives in the text, excluding aa, anan, or thethe. If you spot Erik Killmonger, wave at him.

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Problem 64946

Find the xx-intercept and yy-intercept of the line x+2y=2-x + 2y = 2. xx-intercept: 2, yy-intercept: ?

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Problem 64947

Identify the adjectives in the sentence: Eleanor Wong has willing and able teammates.

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Problem 64948

Find the bearing of an airplane at (17,0)(17,0) from the origin. Provide both angle measures for the bearing.

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Problem 64949

Find the distance from the zero at 4 to the line of symmetry at x=3x=-3, and determine the other zero of the quadratic function.

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Problem 64950

Select all adjectives in the sentence: M'Baku dances to Romanian jazz.

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Problem 64951

Find the slope-intercept form of a line with xx-intercept =7=7 and yy-intercept =2=2.

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Problem 64952

Solve the system using Gaussian elimination and backward substitution. Find the ordered triple for xx, yy, zz:
x+2y+4z=14x+3y+4z=8x+y5z=20 \begin{array}{rr} x+2y+4z= & 14 \\ -x+3y+4z= & 8 \\ x+y-5z= & -20 \end{array}
Choose A, B, or C based on the solution type.

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Problem 64953

Jeremy walked 14\frac{1}{4} of the way to school (1.5 miles). How far did he ride with his friend?

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Problem 64954

Find the quotient and simplify: (y4)2/5÷(5y20)/25(y-4)^{2}/5 \div (5y-20)/25. Select one: A, B, C, or D.

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Problem 64955

A car moves at 41 m/s using 756 J/s. How far does it travel using 52,700 J? Calculate the distance.

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Problem 64956

Select all the adjectives in the sentence: "Shuri and the amazing musicians held a secret meeting to plan the concert."

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Problem 64957

To eliminate xx in the system below, if you multiply the first equation by 8, what should you multiply the second by?
6x+8y=58x13y=0 \begin{array}{l} -6 x+8 y=-5 \\ -8 x-13 y=0 \end{array}

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Problem 64958

Find the discount on rubber boots that cost \27.95nowpricedat$21.45.Use27.95 now priced at \$21.45. Use x$ to represent the discount.

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Problem 64959

Find the yy-intercept and xx-intercept of the line: 5x6y=305x - 6y = 30. What are the intercepts?

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Problem 64960

Select all the adjectives except for aa, anan, or thethe in the sentence: Ernesto de la Cruz loves French toast.

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Problem 64961

Find the solutions for x2=81x^{2}=81 using factoring methods.

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Problem 64962

If 23\frac{2}{3} of Mrs. Wright's class is 10 students, how many students are in her class?

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Problem 64963

At a talent show, half the acts were musical. If three quarters of those were solos, what fraction were solo musical acts?

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Problem 64964

Convierte el número decimal periódico 33,3%33, \overline{3} \% a fracción.

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Problem 64965

Solve the compound inequality: 3(z1)33(z-1) \geq -3 or 7z97-z \leq 9. Provide the solution set in interval notation.

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Problem 64966

Find the new function after a horizontal shrink by 1/31 / 3 applied to f(x)=x1+3f(x)=|x-1|+3.

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Problem 64967

Find the bearing of an airplane at (5,5)(-5,-5) from the origin. Provide the bearing as a single angle measure.

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Problem 64968

Add and simplify: 211+x+x+611+x\frac{2}{11+x}+\frac{x+6}{11+x}. Choose the correct answer from the options given.

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Problem 64969

Are Jessica's rate of 4 laps9 minutes\frac{4 \text{ laps}}{9 \text{ minutes}} and Luke's rate of 8 laps27 minutes\frac{8 \text{ laps}}{27 \text{ minutes}} equivalent?

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Problem 64970

Let y=f(x)y=f(x) be a twice-differentiable function such that f(1)=3f(1)=3 and dydx=4y2+7x2\frac{d y}{d x}=4 \sqrt{y^{2}+7 x^{2}}. What is the value of d2ydx2\frac{d^{2} y}{d x^{2}} at x=1x=1 ? (A) 10 (B) 23 (C) 55 (D) 160

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Problem 64971

Step 1: \quad Subtract the exponents of powers with like bases. (x6y2)2\left(\frac{x^{6} y}{2}\right)^{-2}
Step 2: Apply the power of a product rule. x12y222\frac{x^{-12} y^{-2}}{2^{-2}}
Step 3: Write negative exponents as reciprocals using positive exponents. 122x12y2\frac{1}{2^{2} x^{12} y^{2}}
Step 4: Evaluate the power with the integer base. 14x12y2\frac{1}{4 x^{12} y^{2}}
In which step did Loi make the first error?

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Problem 64972

Which xx-value is a solution to 6x+8<16?-6 x+8<-16 ?

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Problem 64973

Order of Operations: Exercise 2 Grace
Date: \qquad Girace Answer these questions in your notebook. Set up each question properly and show all work clearly.
1. 8233+4×7(6(2)×(4)÷8×311)÷830÷(6))25\left.8^{2}-3^{3}+4 \times 7-(6-(-2) \times(-4) \div 8 \times 31-1) \div 8-30 \div(-6)\right)-2^{5}
2. (1)84÷5×5+694÷(716÷2)694+(3×(8)24)×13÷89+619(-1)^{84} \div 5 \times 5+694 \div(7-16 \div 2)^{694}+(-3 \times(-8)-24) \times 13 \div 89+6-19
3. 77×8÷77×[16+(7×2÷7×2)16+4]77 \times 8 \div 77 \times[16+(7 \times 2 \div 7 \times 2)-16+4]
4. 98(77)÷(7)+8(63×4)+(6+(2)(5)+32)(8(6)×3)98-(-77) \div(-7)+8-(6-3 \times 4)+(6+(-2)-(-5)+3-2)(8-(-6) \times 3)
5. (59+3)(15÷8×2÷3×4+4)(1÷8×(8))(6×55)(3÷9×9(2))(4)(5-9+3)(-15 \div 8 \times 2 \div 3 \times 4+4)(1 \div 8 \times(-8))(6 \times 5-5)(3 \div 9 \times 9-(-2))(-4)
6. 2369×125÷23×(4)÷(1)×2(25×91×(4)÷(7)×(3)+(12))2369 \times 125 \div 23 \times(-4) \div(-1) \times 2-(25 \times 91 \times(-4) \div(-7) \times(-3)+(-12))
7. 1÷22÷11×121×(6)2(36÷(33)×(11)÷4)÷(7(2)(5))(7)51 \div 22 \div 11 \times 121 \times(-6)-2(36 \div(-33) \times(-11) \div 4) \div(7-(-2)(-5))-(-7)-5
8. 60×85÷3÷(85)×1443÷481×(254×4)(16)+57-60 \times 85 \div 3 \div(-85) \times 1443 \div 481 \times\left(2^{5}-4 \times 4\right)-(1-6)+5-7
9. 5×4×3×2×10÷16×27+(173÷12×(2)÷(1)×(2)+5)×(7(5))5 \times 4 \times 3 \times 2 \times 1-0 \div 16 \times 27+(-17-3 \div 12 \times(-2) \div(-1) \times(-2)+5) \times(-7-(-5)) 3(819+2)(21)-3(8-19+2)-(-2-1)
10. 3(9+69+6)(8)÷(5)×(7×(6)(6)×(4)+7)(1136)11393(9+6-9+6)-(-8) \div(-5) \times(-7 \times(-6)-(-6) \times(-4)+7)-(-1136)-1139
11. 9(1216)×42÷(8)÷(7)(810)(3+3)÷97×563(13)+2×4-9-(-12-16) \times 42 \div(-8) \div(-7)-(8-10)(-3+3) \div 97 \times 563-(-13)+2 \times 4
12. 1÷(5)×3×104(12(6)×(2))÷7×(3)+3÷9×(93×2)1 \div(-5) \times 3 \times 10-4(12-(-6) \times(-2)) \div 7 \times(-3)+3 \div 9 \times(9-3 \times 2)
13. 8×37×(5)×255×17×(5)×4×3×5×(2)(12)÷3(1)-8 \times 37 \times(-5) \times 25-5 \times 17 \times(-5) \times 4 \times 3 \times 5 \times(-2)-(-12) \div 3-(-1)
14. (27×5)(53×2)+(5+3×(2))×(16)÷(2)+(27)(6+(5)÷(5))(-2-7 \times 5)(5-3 \times 2)+(-5+3 \times(-2)) \times(-16) \div(-2)+(2-7)(-6+(-5) \div(-5)) +(3×(5)2×2)(24÷28×(14)÷6)(3)×(2)+(3 \times(-5)-2 \times 2)(-24 \div 28 \times(-14) \div 6)-(-3) \times(-2)
15. (3)3(2)2÷7×(3)×14÷(2)(3)×(232×(2)6)76×(1)181×(2)3(-3)^{3}-(-2)^{2} \div 7 \times(-3) \times 14 \div(-2)-(-3) \times\left(-2-3^{2} \times(-2)-6\right)^{76} \times(-1)^{181} \times(-2)^{3}

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Problem 64974

Locating Fractions on a Number Line
Use the drop-down menus to label the points on the number line.
Point AA is at \square Point BB is at \square Point CC is at \square Point DD is at \square
Intro

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Problem 64975

y=5x5D:xR:y\begin{aligned} y & = 5 - \frac{x}{5} \\ D: & \leq x \leq \\ R: & \leq y \leq \end{aligned}

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Problem 64976

Oliver has a points card for a movie theater. - He receives 65 rewards points just for signing up. - He earns 9.5 points for each visit to the movie theater. - He needs 141 points for a free movie ticket.
Write and solve an equation which can be used to determine vv, the number of visits Oliver must make to earn a free movie ticket.
Answer Attempt 1 out of 2
Equation: \square Answer: v=v= \square

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Problem 64977

A new apartment complex is being built down the street from Denise's house. The apartment complex has 4 floors, and residents can choose between the Kensington floor plan with 2 bedrooms or the Windshire floor plan with 3 bedrooms. There are kk Kensington apartments and ww Windshire apartments on each floor.
Pick all the expressions that represent how many bedrooms are in the new apartment complex. 4(2k+3w)4(2 k+3 w) 20(k+w)20(k+w) 8k+12w8 k+12 w 4(2k)+4(3w)4(2 k)+4(3 w)

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Problem 64978

Find the vertex, axis of symmetry (AOS), domain, range, and transformations of the function f(x)=3x2 f(x) = 3|x-2| .

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Problem 64979

3x3x22xx2/33x2\frac{\sqrt{3 x} \cdot 3 x}{2}-\frac{2 x \cdot x^{2 / 3 \sqrt{3} x}}{2}

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Problem 64980

The questions in the arithmetic test are each followed by four possible answers. Decide which answer is correct and then mark the space on your answer sheet that has the same number and letter as your choice. Use scratch paper for any figuring you need to do.
1. If a hexahedral die is rolled two times, what's the probability of NOT rolling a five both times? (A) 1/361 / 36 (B) 1/61 / 6 (C) 4/364 / 36 (D) 25/3625 / 36
2. Jack loaned Bob $1,500\$ 1,500 at an annual interest rate of 7%7 \%. After one year, how much will Bob owe Jack? (A) $105\$ 105 (B) $1,500\$ 1,500 (C) $1,605\$ 1,605 (D) $1,507\$ 1,507

A 2-ton truck is taxed at a rate of $0.12\$ 0.12 per pound. How much is the total tax bill? (A) $480\$ 480 (B) $240\$ 240 (C) $120\$ 120 (D) $600\$ 600
If ab=10a b=10, and a2+b2=30a^{2}+b^{2}=30, solve for yy in the equation, y=(a+b)2y=(a+b)^{2}. A) 40 B) 45 c) 50 ) 55
5. A half-pint of cream is what part of a gallon? (A) 1/81 / 8 (B) 1/11 / 1 (C) 1/161 / 16 (D) 1/61 / 6
6. The cost of a protein bar increased from $2.50\$ 2.50 to $2.80\$ 2.80. The percent increase to the $2.80\$ 2.80 rate was how much? (A) 16%16 \% (B) 10%10 \% (C) 15%15 \% (D) 12%12 \%
7. An aircraft flies over Boondock Air Force Base at 10:20 a.m. At 10:32 a.m., the plane passes over Sea Side Naval Air Station, 120 miles away. How fast is the aircraft traveling? (A) 400 mph (B) 500 mph (C) 600 mph (D) 700 mph
8. Last year, Margot grew 50 bushels of cc in her backyard. This year, the yield hh increased 8%8 \%. How many bushels of c did Margot grow this year? (A) 56 (B) 52 (C) 60 (D) 54

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Problem 64981

A person accidentally tosses their cell phone into the air while standing near the base of the CN Tower.
The height h(t)h(t) of the phone (in meters above the ground) after tt seconds is modelled by: h(t)=at2+4at+2, where aRh(t)=-a t^{2}+4 a t+2, \text { where } a \in \mathbb{R}
What is the expression for the instantaneous rate of change of the phone's height a t=1t=1 second? 2a 2a+6-2 a+6 5 3a+23 a+2

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Problem 64982

7. (3 marks) Suppose that h(x)=f(xg(x)),g(2)=3h(x)=f(x g(x)), g(2)=-3, f(6)=4f^{\prime}(-6)=4, and g(2)=5g^{\prime}(2)=5. Find h(2)h^{\prime}(2).

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Problem 64983

Temukan nilai eigen dan vektor eigen dan matriks A -3 3 3-5 3 6-64

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Problem 64984

The data shows the percentage of households (in decimals) using video streaming services from 2018 to 2022 in Canada. \begin{tabular}{|l|c|c|c|c|c|} \hline Year & 2018 & 2019 & 2020 & 2021 & 2022 \\ \hline \% of Households & 25 & 38 & 47 & 55 & 65 \\ \hline \end{tabular}
Estimate the instantaneous rate of change in the percent of households using video streaming services in the year 2019, using the averaging a preceding and following interval method.
ANSWER INSTRUCTIONS: - your answer should be rounded to the nearest tenth: - do no add extra spaces - do not add a unit of measurement

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Problem 64985

Complete the proof that FGH\triangle F G H \cong FHG\triangle F H G.

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Problem 64986

1. Temukan nilai eigen dan vektor eigen dari matriks A=[133353664]A=\left[\begin{array}{ccc}1 & -3 & 3 \\ 3 & -5 & 3 \\ 6 & -6 & 4\end{array}\right]

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Problem 64987

movement of the progress bar may be uneven because questions can be worth more or less (including zero) depending on your answer Mark is buying different nuts to make a mixed nut platter to serve at a party. He buys 1.2 kilograms of peanuts, 300 grams of almonds and 40 dekagrams of cashews. What is the total weight in grams of the nuts he purchased? Enter only the number. Do not include units.

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Problem 64988

When the expression 156×289×35315^{6} \times 28^{9} \times 35^{3} is evaluated, it ends with several consecutive zeros. How many?

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Problem 64989

20. People are entering a stadium at a steady rate of 32 people per minute. When the gates open, there are already 46 people in the stadium. No one leaves the stadium for the first hour after the gates have opened. (a) How many people will be in the stadium 30 minutes after it opens? Show the calculations that lead to you answer. (b) Write a linear equation for the number of people, nn, as a function of the time in minutes, mm, since the gates were opened. 32(30)=960 people +46 people 1006 people \begin{aligned} 32(30) & =960 \text { people } \\ & +46 \text { people } \\ & 1006 \text { people } \end{aligned} n(m)=32n+46n(m)=32 n+46 (c) After one hour, no additional people enter, but some start to leave. If it takes a total of 4 hours for the stadium to completely empty, what is the average rate at which people leave, in people per hour? Show the calculations that lead to your answer. h(60)=32(60)+46=1966 prople \begin{aligned} h(60) & =32(60)+46 \\ & =1966 \text { prople } \end{aligned} =1966=1966 people 19663=6553 people pe \frac{1966}{3}=6553 \geqslant \text { people pe }

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Problem 64990

Copy and complete the statement.
10. 6gal/min=6 \mathrm{gal} / \mathrm{min}= \qquad qt/min\mathrm{qt} / \mathrm{min}
11. 5.3 km/h=5.3 \mathrm{~km} / \mathrm{h}= \qquad m/h\mathrm{m} / \mathrm{h} Copyright \odot Big Ideas Learning, LLC

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Problem 64991

Sale! 75\% OFF of the original price! Video (b) Questions answered 13 Time elapsec
The sale price of a computer keyboard is $9\$ 9. What was the original price? 00 10 HR MIN \ \square$ Smarts out of 1 Submit

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Problem 64992

```latex \text{Write the F Major Scale Ascending in the Bass Clef.} ```

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Problem 64993

45=30\frac{4}{5}=\frac{\square}{30} and 56=30\frac{5}{6}=\frac{\square}{30}, so 45\frac{4}{5} is \square than 56\frac{5}{6}

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Problem 64994

QUESTION 2 Multiply and simplify completely. (26)(4+6)(2-\sqrt{6})(4+\sqrt{6}) \square

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Problem 64995

Use the Quadratic Formula to solve the equation x28x+61=0x^{2}-8 x+61=0 x=x= \square (Separate answers by a comma. Write answers as integers or reduced fractions.)
If the answer is radical use sqrt(5) to denote 5\sqrt{5} (use the correct radicand in the problem!) If the answer is complex use ii to denote ii. Question Help: \square Message instructor Submit Question Jump to Answer

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Problem 64996

A bike store sells scooters at a 54\% markup. If the store bought each scooter for $29.95\$ 29.95, what is the selling price to the nearest dollar?

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Problem 64997

Simpliby mo expression x4y3x2y8x^{4} y^{3} \cdot x^{2} y^{8}

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Problem 64998

Radicals
Use the product rule to simplify the radical. 5454=\begin{array}{c} \sqrt{54} \\ \sqrt{54}=\square \end{array} \square (Simplify your answer. Type an exact answer, using radicals as needed.)

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Problem 64999

d) 210=40(1.5)x210=40(1.5)^{x}

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Problem 65000

LATIHAN
1. Temukan nilai eigen dan vektor eigen dari matriks A=[133353664]A=\left[\begin{array}{ccc}1 & -3 & 3 \\ 3 & -5 & 3 \\ 6 & -6 & 4\end{array}\right]
2. Temukan nilai eigen dan vektor eigen dari matriks A=[0123]A=\left[\begin{array}{cc}0 & 1 \\ -2 & -3\end{array}\right]

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