Expression

Problem 2701

Which of the following fractions are equivalent to 215?\frac{2}{15} ? Select all correct answers.
Select all that apply: 430\frac{4}{30} 2075\frac{20}{75} 1245\frac{12}{45} 860\frac{8}{60} None of the above

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Problem 2702

How Many Birds Do Domestic Cats Kill? "Domestic cats kill many more wild birds in the United States than scientists thought," states a recent article. 1{ }^{1} Researchers used a sample of n=140n=140 households in the US with cats to estimate that 35%35 \% of household cats in the US hunt outdoors. A separate study 2{ }^{2} used KittyCams to record all activity of n=55n=55 domestic cats that hunt outdoors. The video footage showed that the mean number of kills per week for these cats was 2.4 with a standard deviation of 1.51 . Find a 99%99 \% confidence interval for the mean number of kills per week by US household cats that hunt outdoors.
Round your answers to three decimal places.
The 99 confidence interval is i \square to i \square 1{ }^{1} Milius, S., "Cats kill more than one billion birds each year," Science News, 183(4), February 23, 2013, revised March 8, 2014. Data approximated from information give in the article. 2{ }^{2} Loyd KAT, et al., "Quantifying free-roaming domestic cat predation using animal-borne video cameras," Biological Conservation, 160(2013), 183-189.

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Problem 2703

18. 8sin(3xπ4)cos(x+π2)dx\int 8 \sin \left(3 x-\frac{\pi}{4}\right) \cos \left(x+\frac{\pi}{2}\right) d x

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Problem 2704

Perform synthetic division on the expression: 4x36x2+2x10x+2\frac{4x^{3} - 6x^{2} + 2x - 10}{x+2}.

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Problem 2705

19. tan5xdx\int \tan ^{5} x d x

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Problem 2706

15) Which binomial is not a factor of the expression x311x2+16x+84?x^{3}-11 x^{2}+16 x+84 ? 1x+221 x+2-2 84432+44-8-44-32 '+44 2x+442 x+4-4 64+4464+84-64+44-64+84 3x664x77\begin{array}{lll}3 & x-6 & 6 \\ 4 & x-7 & 7\end{array} 21666+96+84216-66+96+84 34377+112+84343-77+112+84

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Problem 2707

TONY RODRIGUEZ
Question 6 of 15, Step 1 of 1 5/15 Correct 3
Use synthetic division to rewrite the following fraction in the form q(x)+r(x)d(x)q(x)+\frac{r(x)}{d(x)}, where d(x)d(x) is the denominator of the original fraction, q(x)q(x) is the quotient, and r(x)r(x) is the remainder. 3x6+18x52x312x2+4x+24x+6\frac{3 x^{6}+18 x^{5}-2 x^{3}-12 x^{2}+4 x+24}{x+6} Keyp Keyboard Shor |\begin{tabular}{c|c|c|c|c|c|c} ±\pm & ×\times & ÷\div & \neq & == & << & >> \\ \cup & \cap & \in & 1 & \infty & \leq & \geq \\ \circ & \varnothing & N\mathbb{N} & Z\mathbb{Z} & Q\mathbb{Q} & R\mathbb{R} & C\mathbb{C} \\ & 0 \end{tabular} \square

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Problem 2708

More pitching: A baseball pitcher threw 3935 pitches during part of a recent season. Of these, 1947 were thrown with no strikes on the batter, 996 were thrown with one strike, and 992 were thrown with two strikes.
Part 1 of 2 (a) What is the probability that a baseball pitch is thrown with no strikes? Round your answer to four decimal places. P(P( A baseball pitch thrown with no strikes )=0.4948)=0.4948
Part: 1/21 / 2
Part 2 of 2 (b) What is the probability that a baseball pitch is thrown with fewer than two strikes? Round your answer to four decimal places. P(AP(A baseball pitch thrown with fewer than two strikes )=)= \square Skip Part Chack

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Problem 2709

A pair of dice is rolled. What is the probability of getting a sum of 11?11 ?
What is the probability of getting a sum of 11?11 ? \square (Simplify your answer. Type a fraction.)

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Problem 2710

Save \& Exit Certify Lesson: 6.2 Polynomial Division and the Di... This Conne... Home Home Lesson 6.2...
Question 11 of 15, Step 1 of 1 9/15 TONY RODRIGUEZ Correct 2 the remainder. 4x5+25x4+24x35x2+6x+5\frac{4 x^{5}+25 x^{4}+24 x^{3}-5 x^{2}+6}{x+5}
Answer

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Problem 2711

36&4036 \& 40 Evaluate the integral by interpreting it in terms of areas.
40. 012x1dx\int_{0}^{1}|2 x-1| d x

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Problem 2712

(12m2n3)3(18m1n4)2\left(\frac{1}{2} m^{-2} n^{3}\right)^{3} \cdot\left(\frac{1}{8} m^{-1} n^{4}\right)^{-2}

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Problem 2713

\text{The probability that a smoking-related death was the result of either chronic obstructive pulmonary disease or lung cancer is } \square \text{ - (Round the answer to four decimal places.)} \\
\text{The Centers for Disease Control and Prevention reported that there were 443,000 smoking-related deaths in the United States in a recent year. The numbers of deaths caused by various illnesses attributed to smoking are as follows:} \\
\begin{tabular}{lr} \hline \text{Illness} & \text{Number} \\ \hline \text{Lung cancer} & 128,900 \\ \text{Ischemic heart disease} & 126,000 \\ \text{Chronic obstructive pulmonary disease} & 92,900 \\ \text{Other} & 95,200 \\ \hline \text{Total} & 443,000 \\ \end{tabular} \\

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Problem 2714

24+20=24142×5\begin{array}{l}2 \\ 4+20=24 \\ 14^{2} \times 5\end{array}

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Problem 2715

Pepcid A study of 74 patients with ulcers was conducted in which they were prescribed 40 mg of Pepcid TM{ }^{\mathrm{TM}}. After 8 weeks, 58 reported ulcer healing. (a) Obtain a point estimate for the proportion of patients with ulcers receiving Pepcid who will report ulcer healing. (b) Verify that the requirements for constructing a confidence interval about pp are satisfied. (c) Construct a 99%99 \% confidence interval for the proportion of patients with ulcers receiving Pepcid who will report ulcer healing. (d) Interpret the confidence interval.

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Problem 2716

26. 32log3a14log3(16a2)\frac{3}{2} \cdot \log _{3} a-\frac{1}{4} \cdot \log _{3}\left(16 a^{2}\right)

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Problem 2717

2. Odredite zbroj visina uu raznostraničnom trokutu (va+vb+vc)\left(v_{a}+v_{b}+v_{c}\right) na 3 decimale ako su poznate stranice trokuta a=32.44 mm,b=31.59 mma=32.44 \mathrm{~mm}, b=31.59 \mathrm{~mm} i c=43.38 mmc=43.38 \mathrm{~mm}. va+vb+vc=v_{a}+v_{b}+v_{c}= \qquad mm (15\%)

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Problem 2718

A water pipe reduces in cross-sectional area from 0.08 m20.08 \mathrm{~m}^{2} to 0.027 m20.027 \mathrm{~m}^{2}, how many times faster will water flow through the smaller section of the pipe than the larger section of the pipe.
Give your result to 2 decimals. (There are no units in the answer to this question.) Your Answer:
Answer

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Problem 2719

1. What is the area of a rectangle with dimensions of 6 ft by 4 ft ? A. 10ft210 \mathrm{ft}^{2} B. 24ft224 \mathrm{ft}^{2} C. 2ft22 \mathrm{ft}^{2} D. 1.5ft21.5 \mathrm{ft}^{2}

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Problem 2720

Simplify the expression completely: 5x18y2037x5y7\frac{5 x^{18} y^{20}}{37 x^{5} y^{7}}
Answer = \square

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Problem 2721

Write x27\sqrt[7]{x^{2}} using rational exponents

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Problem 2722

115) В рівнобічній трапеціи діагоналі взаємно перпендикулярні. Висота трапеції дорівнюе 8 cm . Знайти периметр трапеціі, якщо бічна сторона дорівнює 12 cm .
116. В прямокутній трапедії діагональ є бісектрисою ту-

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Problem 2723

1. limx+1xtan(2x)\lim _{x \rightarrow+\infty} \frac{\frac{1}{x}}{\tan \left(\frac{2}{x}\right)}

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Problem 2724

3. limx0+xxx\lim _{x \rightarrow 0^{+}} x^{x^{x}}

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Problem 2725

2. Write each as a power of 5 . a) 20 b) 0.8

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Problem 2726

Вычислить неопределенные интегралы, сводя их к табличным:
1. (2x53x2)dx=x63x3+C\int\left(2 x^{5}-3 x^{2}\right) d x=\frac{x^{6}}{3}-x^{3}+C

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Problem 2727

a8=R22a_{8}=R \sqrt{2-\sqrt{2}}, де RR - радіус описаного кола.
5. Середини сторін правильного дванадцятикутника сполучено через одну так що отриманою фігурою є правильний шестикутник. Знайти сторону шестикутника, якщо сторона дванадцятикутника дорівнює 2 см.

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Problem 2728

25. Indicate whether the decimal equivalent for the rational number is a repeating decitont or a terminating decimal. \begin{tabular}{l|l|l} Rational Number & Repeating Decimal & Terminating Decimal \\ \hline38\frac{3}{8} & & \\ \hline311\frac{3}{11} & & \\ \hline1714-\frac{17}{14} & & \\ \hline732-\frac{7}{32} & & \\ \hline1136-\frac{11}{36} & & \\ \hline \end{tabular}

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Problem 2729

Question 8 Not yet answered
Marked out of 1.50
P Flag question
Simplify the Boolean function to a minimum number of literals: F=XY+X(X+Y)(Y+Z)F=X^{\prime} Y+X\left(X+Y^{\prime}\right)\left(Y+Z^{\prime}\right) a. F=Y+X+Z\mathrm{F}=\mathrm{Y}+\mathrm{X}+\mathrm{Z}^{\prime} b. F=Y+XZF=Y+X Z^{\prime} c. F=YZ\quad \mathrm{F}=\mathrm{Y} \mathrm{Z}^{\prime} d. F=Y+XZF=Y^{\prime}+X^{\prime} Z^{\prime}

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Problem 2730

5.7×105 5.7 \times 10^{5}

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Problem 2731

Investigate this question by building rectangles with algebra tiles for the following expressions. For each one, write the area as a sum and as a product. If you cannot build a rectangle, be prepared to convince the class that no rectangle exists (and thus the expression cannot be factored). a. 2x2+7x+62 x^{2}+7 x+6 b. 6x2+7x+26 x^{2}+7 x+2 c. x2+4x+1x^{2}+4 x+1 d. 2xy+6x+y2+3y2 x y+6 x+y^{2}+3 y

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Problem 2732

There are 600 centimeters of tape on each roll. How many centimeters of tape are there on 7 rolls? \square centimeters
Submit Work it out Not feeling ready yet? These can help:

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Problem 2733

\frac{\text { Hints }}{5 \longdiv { . 0 1 3 5 }}

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Problem 2734

sin1(5x)dx\int \sin ^{-1}(5 x) d x

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Problem 2735

Learn with an example or Watch a video
After bisecting an angle measuring 88^{\circ}, Stacy has two angles. What is the measure of each new angle? 88^{\circ} \square - Submit

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Problem 2736

After bisecting an angle measuring 3030^{\circ}, Pamela has two angles. What is the measure of each new angle? Submit

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Problem 2737

Match each expression to its equivalent expression. \begin{tabular}{lccc} 13x+1423x\frac{1}{3} x+\frac{1}{4}-\frac{2}{3} x & \bigcirc & 34x+13\frac{3}{4} x+\frac{1}{3} & 13x+14-\frac{1}{3} x+\frac{1}{4} \\ 13x+14+23x\frac{1}{3} x+\frac{1}{4}+\frac{2}{3} x & \bigcirc & \\ 23+34x13\frac{2}{3}+\frac{3}{4} x-\frac{1}{3} & \bigcirc & & \end{tabular}

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Problem 2738

Select all the expressions that represent the verbal the difference of 12 and 20%20 \% of a number xx 2.4x2.4 x 0.2x+12-0.2 x+12 1220x12-20 x 120.2x12-0.2 x 20x+12-20 x+12

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Problem 2739

Consider statements pp and qq. pp : It is cloudy. qq : Melissa is wearing a coat. For parts (a) and (b), fill In the symbolic form. For part (c), choose the descriptive form.
Descriptive form Symbolic form (a) Melissa is not wearing a coat only if it is cloudy. (b) It is not cloudy if and only if Melissa is not wearing a coat. \square (c) (Choose one) qpq \leftrightarrow \sim p

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Problem 2740

t p2p_{2} Alyebra 2 Exam\#2
4. Divide by synthetue Division 6x4+4x3+2xx1\frac{6 x^{4}+4 x^{3}+2 x}{x-1}

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Problem 2741

4. Find all the factor pairs for 32 by writing multiplication expressions. Then circle or composite for 32.

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Problem 2742

(a) limx3x129x2\lim _{x \rightarrow 3} \frac{\sqrt{x-1}-\sqrt{2}}{9-x^{2}}.

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Problem 2743

Match the following expression with what it would be AFTER you distribute.
6(x3)6(x-3) 6(x+3)-6(x+3) 6(x+3)6(x+3) 6(x3)-6(x-3) 6x186 x-18 6x+186 x+18 6x+18-6 x+18 6x18-6 x-18

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Problem 2744

(n+1)2+22n+1+(2)n+11n2+22n+(2)n1\frac{(n+1)^{2}+2}{2^{n+1}+(-2)^{n+1}-1}-\frac{n^{2}+2}{2^{n}+(-2)^{n}-1}

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Problem 2745

Find the exact value of tanY\tan Y in simplest radical form.

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Problem 2746

13. 21112=2 \frac{11}{12}=

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Problem 2747

x4+6x3+8x2x4÷(x+1)x^{4}+6 x^{3}+8 x^{2}-x-4 \div(x+1)

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Problem 2748

x ^ { 2 } - 5 \longdiv { 4 x ^ { 4 } + 4 x ^ { 3 } - 2 0 x ^ { 2 } - 2 9 x - 9 }

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Problem 2749

1. 2x5y3x2y2 x^{5} y \cdot 3 x^{2} y

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Problem 2750

A coffee table in the shape of a rectangular prism has a height of xx inches and a length of (2x+15)(2 x+15) inches. If the expression x(2x+15)(x+10)x(2 x+15)(x+10) represents the volume of the coffee table, in cubic inches, where x>0x>0, which statement must be true? The width of the coffee table is 10 inches longer than the height of the coffee table. The width of the coffee table is 10 inches longer than the length of the coffee table. The width of the coffee table is 10 inches shorter than the height of the coffee table. The width of the coffee table is 10 inches shorter than the length of the coffee table.

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Problem 2751

DirECTIONS: Find the sum or difference of the following polynomials. Write your solution in standard form.
1. (8x3+72x)(85x7x3)\left(8 x^{3}+7-2 x\right)-\left(8-5 x-7 x^{3}\right)

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Problem 2752

Jing makes a cut through a block of butter, as shown. What are the dimensions of the exposed cross-section? A. 3 cm×4 cm3 \mathrm{~cm} \times 4 \mathrm{~cm} B. 6 cm×8 cm6 \mathrm{~cm} \times 8 \mathrm{~cm} C. 3 cm×5 cm3 \mathrm{~cm} \times 5 \mathrm{~cm} D. 5 cm×4 cm5 \mathrm{~cm} \times 4 \mathrm{~cm}

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Problem 2753

What is the surface area of this solid? A. 40.82 B. 47.1 C. 50.24 D. 37.68

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Problem 2754

The ratio of the lengths of corresponding parts in two similar solids is 2:1. What is the ratio of their surface areas? A. 6:16: 1 B. 4:14: 1 C. 8:18: 1 D. 2:12: 1

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Problem 2755

Mariana is buying laundry pods at the supermarket. Each laundry pod contains 0.8 ounces of liquid detergent.
Write 0.8 ounces as a fraction in simplest form. \square of an ounce Write 0.8 ounces as a percent. \square \% of an ounce Submit

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Problem 2756

The ratio of the surface areas of two similar solids is 16:14416: 144. What is the ratio of their corresponding side lengths? A. 1:961: 96 B. 1612:12\frac{16}{12}: 12 C. 4:14444: \frac{144}{4} D. 4:124: 12

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Problem 2757

Question Given that sinx=25\sin x=\frac{2}{5} and cosy=34\cos y=\frac{\sqrt{3}}{4}, and that angles xx and yy are both in Quadrant II, find the exact value of sin(x+y)\sin (x+y), in simplest radical form.

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Problem 2758

A coin is tossed 4 times. Which of the following represents the probability of the coin landing on heads all 4 times? A. 164\frac{1}{64} B. 14\frac{1}{4} c. 116\frac{1}{16} D. 1128\frac{1}{128}

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Problem 2759

(d) What can you deduce about the order of 7n3+10n2+37 n^{3}+10 n^{2}+3.
S 295: Discrete Structures

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Problem 2760

Для вычисления этого интеграла вы сделали замену. Чему равен dt ? e5x+1dx\int e^{5 x+1} d x
Ответ записать в строку без пробелов и скобок. Знак умножения не пишем. Знак деления:/

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Problem 2761

Для вычисления этого интеграла вы сделали замену. Чему равен dx? cos(3x+5)dx\int \cos (3 x+5) d x
Ответ записать в строку без пробелов и скобок. Знак умножения не пишем. Знак деления: /

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Problem 2762

=5+1==\sqrt{5}+1=

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Problem 2763

=5+1==\sqrt{5}+1=

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Problem 2764

\%kuta Software - Infinite Algebra 1 Factoring Trinomials (a>1)(a>1) Factor each completely. 1) 3p22p53 p^{2}-2 p-5

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Problem 2765

If lna=2,lnb=3\ln a=2, \ln b=3, and lnc=5\ln c=5, evaluate the following: (a) ln(a2b2c2)=\ln \left(\frac{a^{2}}{b^{2} c^{2}}\right)= \square

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Problem 2766

7 Expand and simplify. (3x5y)(2x+y)(3 x-5 y)(2 x+y)

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Problem 2767

Name: \qquad D.
10. Factor this polynomial: 6x213x286 x^{2}-13 x-28

A (2x+7)(3x+4)(2 x+7)(3 x+4) C (2x+7)(3x4)(2 x+7)(3 x-4)
18. (2x7)(3x4)(2 x-7)(3 x-4) (D) (2x7)(3x+4)(2 x-7)(3 x+4)

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Problem 2768

20+1554321626\frac{20+15}{\sqrt{54}-3 \sqrt{216}-2 \sqrt{6}}

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Problem 2769

A store selling school supplies advertises a bundle deal. The consumer can pick a backpack, a binder, a pack of pencils, and notebook paper for a set price. There are 5 types of backpacks, 5 types of binders, 3 types of pencils, and 2 types of notebook paper. How many outcomes are possible in this bundle? A. 140 B. 25 C. 15 D. 150

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Problem 2770

Select all the expressions that are equivalent to 38333^{-8} \cdot 3^{-3}. 3113^{-11} 3243^{24} 3833\frac{3^{-8}}{3^{3}} 1311\frac{1}{3^{-11}}

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Problem 2771

Which of the following is an example of the compliment rule being applied to mutally exclusive events? A. The probability of drawing a spade or ace from a deck of cards. B. The probability of not drawing a spade or ace from a deck of cards. C. The probability of rolling a 5 or 9 on a die. D. The probability of not rolling a 5 or 9 on a die.

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Problem 2772

Writing algebraic expressions for the perimeter of a figure
Ite two expresslons for the perimeter of the figure.
Note: The figure is not drawn to scale. (a) Use all five side lengths. perimeter = \square ++ \square ++ \square ++ \square ++ \square (b) Simplify the expression from part (a). perimeter = \square Expmantion Check

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Problem 2773

(Adding and Subtracting Linear Expressions MC) Write the following expression using the fewest possible terms. (2x13)+(19+5x)(-2 x-13)+(19+5 x) 3x+(6)3 x+(-6) 7x+(6)7 x+(-6) 7x+327 x+32 3x+63 x+6

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Problem 2774

4519:2=\frac{45}{19}: 2=

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Problem 2775

Find cosθ\cos \theta, where θ\theta is the angle shown. Give an exact value, not a decimal approximation.

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Problem 2776

Find the limit, if it exists. (If an answer does not exist, enter DNE.) lim(x,y)(0,0)xy8x3+y12\lim _{(x, y) \rightarrow(0,0)} \frac{x y^{8}}{x^{3}+y^{12}}

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Problem 2777

Expand and simplify (3x+2)(2x+3)(3 x+2)(2 x+3)

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Problem 2778

1. Simplify the expression cot2x1+cot2x\frac{\cot ^{2} x}{1+\cot ^{2} x} to a single trigonometric ratio. 1tan2x÷1+1tan2x\frac{1}{\tan ^{2} x} \div 1+\frac{1}{\tan ^{2} x}

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Problem 2779

Find the area of the circle. Round to the nearest tenth 1139 7m

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Problem 2780

For the graph shown to the right, find (a) ABA B to the nearest tenth and (b) the coordinates of the midpoint of AB\overline{A B}. a. AB=A B= \square (Round to the nearest tenth as needed.)

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Problem 2781

Multiply. 3u9w76u2w83 u^{9} w^{7} \cdot 6 u \cdot 2 w^{8}
Simplify your answer as much as possible. \square

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Problem 2782

Exponents and Exponential Functions Product rule with positive exponents: Multivariate
Multiply. 3v47w2w9v93 v^{4} \cdot 7 w \cdot 2 w^{9} v^{9}
Simplify your answer as much as, possible. \square \square

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Problem 2783

stion list Use the properties of logarithms to rewrite the following expression if possible. Assume that all variables represent positive real numbers.
Question 4
Question 5
Question 6
Question 7 Question 8 Question 9
Select the correct choice below, and fill in the answer box if necessary. A. logbxy4z9=\log _{b} \frac{x y^{4}}{z^{9}}= \square (Simplify your answer.) B. The expression logbxy4z9\log _{b} \frac{x y^{4}}{z^{9}} cannot be rewritten as a sum or difference of logarithms.

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Problem 2784

What is 68\sqrt{68} in simplest form? A. 848 \sqrt{4} B. 17217 \sqrt{2} C. 4174 \sqrt{17} D. 2172 \sqrt{17}

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Problem 2785

x5y1x7y3\frac{x^{5} y^{-1}}{x^{7} y^{-3}}

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Problem 2786

21. ¿Cuál es el valor de (5+1)(51)(\sqrt{5}+1)(\sqrt{5}-1) ? A) 2 B) 4 C) 6\sqrt{6} D) 252 \sqrt{5}

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Problem 2787

Simplify. i68i^{68}

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Problem 2788

1) 34493 \sqrt{\frac{4}{49}} \quad (Intermediate)

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Problem 2789

How much money does Emily need to buy a tennis ticket, a hockey ticket, and a baseball ticket? \begin{tabular}{|ll|} \hline tennis ticket & $41.10\$ 41.10 \\ \hline baseball ticket & $17.64\$ 17.64 \\ \hline hockey ticket & $62.97\$ 62.97 \\ \hline golf ticket & $97.83\$ 97.83 \\ \hline soccer ticket & $34.01\$ 34.01 \\ \hline \end{tabular}

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Problem 2790

What is 40%40 \% of 10?10 ?

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Problem 2791

Subtract (6.25x+12)(4.25x7)(6.25 x+12)-(4.25 x-7) (A) 2x52 x-5 (B) 2x+52 x+5 (C) 2x192 x-19 (D) 2x+192 x+19

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Problem 2792

Given mnm \| n, find the value of x .
Answer Attempt 1 outb) 2 x=x= \square Submit Answer

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Problem 2793

ctor completely. x32x2x+2x^{3}-2 x^{2}-x+2

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Problem 2794

5. Select all of the expressions that represent the verbal phrase. the sum of 10 and 10%10 \% of a number xx 10x+1010 x+10 10+10x10+10 x 0.1x+100.1 x+10 10+0.1x10+0.1 x 100.1x10-0.1 x

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Problem 2795

A bag contains 2 red marbles, 3 blue marbles, and 5 green marbles. If a marble is randomly selected from the bag, what is the probability that it is blue? 13\frac{1}{3} 310\frac{3}{10} 15\frac{1}{5} 17\frac{1}{7}

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Problem 2796

7. Subtract (5x+13)(3x16)\left(5 x+\frac{1}{3}\right)-\left(3 x-\frac{1}{6}\right).

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Problem 2797

Factor fully, if possible. a) x2+7x+12x^{2}+7 x+12

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Problem 2798

1cos2θ1cosθ\frac{1-\cos ^{2} \theta}{1-\cos \theta}

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Problem 2799

11. Consider the expression 53c11214c2\frac{5}{3} c-\frac{1}{12}-\frac{1}{4} c-2
Part A Simplify the expression.

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Problem 2800

A musician plans to perform 5 selections for a concert. If he can choose from 8 different selections, how many ways can he arrange his program? 40 6720 32,768 56

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