Expression

Problem 7501

Find the average daily pay for Ben, given his earnings: \$78, \$94, \$115, \$108, \$67, \$78.

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Problem 7502

Calculate the value of $\frac{-39}{3}$ .

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Problem 7503

Evaluate $2x + 7 + 8x$ at $x = -4$ and simplify.

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Problem 7504

Identify the first step to simplify the expression: $4-5(3 x+3)$ .

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Problem 7505

Simplify the expression: $-3(2-x)-2(4x-10)$

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Problem 7506

Simplify $\frac{f(x+h)-f(x)}{h}$ for $f(x)=8x+6$ .

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Problem 7507

Simplify the expression by combining like terms: $\frac{-3 x - x}{2} + 9 x$

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Problem 7508

Calculate the area of a rectangle with length 15 cm and width 9 cm using the formula $A = l \times w$ .

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Problem 7509

Calculate the expression: $(8 \times 1) + (5 \times \frac{1}{100}) + (9 \times \frac{1}{1,000})$ .

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Problem 7510

Find the value of $w - 2$ when $w = 8$ .

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Problem 7511

Find the difference between the record high (109°F) and low (-370°F) temperatures in Fargo, ND.

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Problem 7512

Find the total length of two pipes: $4-1/4'$ and $3-1/2'$ . Give the total in fractions of a foot, feet & inches, and inches.

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Problem 7513

True or false: Is 7 a natural number? Choose True or False.

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Problem 7514

Find the value of $4y + 9z$ for $y=5$ and $z=4$ .

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Problem 7515

Find the difference between the record high ( $109^{\circ} \mathrm{F}$ ) and low ( $-37^{\circ} \mathrm{F}$ ) temperatures in Fargo, ND.

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Problem 7516

Calculate the total weight of 3 orders weighing $52 \frac{1}{2} \mathrm{lbs}, 123 \frac{3}{8} \mathrm{lbs}$ , and $\frac{967}{8} \mathrm{lbs}$ in lbs and oz.

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Problem 7517

Find the remaining width of material after cutting a total width of $6\frac{1}{4}$ inches with a saw blade kerf of $\frac{1}{8}$ inch.

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Problem 7518

Evaluate $4 c^{2}$ for $c=6$ .

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Problem 7519

Find the value of $8z - 6$ when $z = 4$ .

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Problem 7520

Calculate: $3 \frac{1}{10} + (-1.3)$

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Problem 7521

The width of a rectangle is 19 cm less than double the length. If $u$ is the length, express the width.

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Problem 7522

Find the distance between the centers of two holes drilled in a 10-1/4" x 3-1/2" plate, each $7/8"$ from the edges.

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Problem 7523

Is the statement true or false? $\sqrt{16}$ is an irrational number. Choose: True or False.

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Problem 7524

Is it true or false that every real number is an integer? Choose: True or False.

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Problem 7525

Is the statement "6 is an integer" true or false? Choose: True or False.

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Problem 7526

Is $\sqrt{12}$ a rational number? Choose true or false and explain your choice. A. True, it's an integer. B. True, it has repeating digits. C. False, it never ends or repeats. D. True, it's a terminating decimal.

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Problem 7527

What is the sum of the temperatures for the 5-day forecast in St. Paul: -6, 3, 4, -2, -1?

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Problem 7528

Insert $<$ or $>$ between $\frac{2}{7}$ and $\frac{7}{8}$ to make the statement true.

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Problem 7529

Calculate the expression: $[2 \times(3+5)+6] \times 4$ .

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Problem 7530

Classify $\angle A B C$ if $m \angle A B C=160^{\circ}$ : Right, Straight, Obtuse, or Acute?

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Problem 7531

Insert $<, >$ , or $=$ in the blank:
$\left|-\frac{2}{5}\right| \square \left|-\frac{5}{2}\right|$

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Problem 7532

Find the absolute value of $2 \frac{1}{2}$ and express it as a mixed number in simplest form.

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Problem 7533

Find the absolute value of 6. What is $|6|$ ?

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Problem 7534

Simplify -|48|. What is -|48| equal to?

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Problem 7535

Find the value of the expression $-|-8|$ .

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Problem 7536

Calculate the distance $UV$ between points $U(2,-2)$ and $V(-5,-3)$ , rounding to the nearest tenth if needed. $UV =$

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Problem 7537

Find the midpoint $M$ of the line segment with endpoints $C(5,3)$ and $D(-3,-6)$ .

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Problem 7538

Find the absolute value of 10. What is $|10| =$ ?

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Problem 7539

Calculate the sum: $\frac{7}{8}+\frac{4}{9}=$

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Problem 7540

Calculate $\frac{7}{8}+\frac{4}{9}$ .

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Problem 7541

Calculate $\frac{1}{5}-\frac{1}{7}$ .

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Problem 7542

Insert $<,>$ , or $=$ to make the statement true: $\frac{1}{11} \cdot \frac{1}{11} \square \frac{1}{11} \div \frac{1}{11}$

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Problem 7543

Find the absolute value of -3: $|-3| =$

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Problem 7544

Simplify -|92|. What is -|92| equal to?

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Problem 7545

Three students raced 100m. Order their times: Tiana: 13.1s, James: $1 \times 10+3 \times 1+2 \times\left(\frac{1}{10}\right)$ , Dakota: twelve and nine tenths. Options: (A) (B) (C) (D).

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Problem 7546

What is the cutting speed of 80 feet per minute in cm per minute? Choose from: 800, 38, 960, 2438.4.

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Problem 7547

Convert the length of a part from $1257 \mathrm{~mm}$ to meters. What is the length in meters?

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Problem 7548

What is the quotient of $5 \div \frac{1}{4}$ ? (A) $\frac{5}{4}$ (B) $\frac{6}{4}$ (C) 20 (D) 21

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Problem 7549

Convert the tolerance range of $\pm0.05$ mm to the nearest 0.001 inch.

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Problem 7550

Convert 12 cubic inches of material removed to cubic centimeters. Options: 196.38, 1966, 16.38, 163.8.

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Problem 7551

Create an expression for "the product of 8 and the sum of a number $x$ and 3".

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Problem 7552

Rewrite each algebraic expression as a verbal phrase. Examples include:
1. $4 q$
2. $\frac{1}{8} y$
3. $15+r$
4. $w-24$
5. $3 x^{2}$
6. $\frac{1}{9}$
7. $2 a+6$
8. $r^{4} \cdot t^{3}$
9. $25+6 x^{2}$
10. $6 f^{2}+5 f$
11. $\frac{3 a^{5}}{2}$
12. $9(a^{2}-1)$
13. $5 g^{6}$
14. $(c-2) d$
15. $4-5 h$
16. $2 b^{2}$
17. $7 x^{3}-1$
18. $p^{4}+6 r$
19. $3 n^{2}-x$
20. $(2+5) p$
21. $18(p+5)$

See Solution

Problem 7553

Find the simplified expression for the sum of $(3x - 3)$ and $(-4x - 9)$ .

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Problem 7554

Convert the tolerance $+/-.125$ inch to mm, rounded to the nearest $1/100$ mm: $3$ mm, $1.25$ mm, $3.17$ mm, or $0.05$ mm?

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Problem 7555

Calculate $6 \frac{1}{2} \times 3 \frac{3}{4}$ . Choose the correct answer from the options: (A) $16 \frac{5}{8}$ , (B) $18 \frac{3}{8}$ , (C) $22 \frac{1}{2}$ , (D) $24 \frac{3}{8}$ .

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Problem 7556

Find the least common denominator (LCD) of $\frac{1}{3}$ and $\frac{1}{4}$ .

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Problem 7557

Find the missing values in the area model for the expression $10(8w + 10)$ .

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Problem 7558

Convert 0.0625 inch to mm. Options: 1.58, 0.002, 6.25, 0.625.

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Problem 7559

Convert $2.73 \mathrm{~cm}$ to inches: 0.1074, 1.0704, 01074, or 107.4 inches?

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Problem 7560

Find the Least Common Denominator (LCD) of $\frac{1}{3}$ and $\frac{1}{4}$ .

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Problem 7561

Convert these fractions to the least common denominator: $\frac{1}{3}$ , $\frac{1}{4}$ . Choose the equivalent from: a. $\frac{8}{12}$ , b. $\frac{9}{12}$ , c. $\frac{3}{12}$ , d. $\frac{6}{12}$ , e. $\frac{4}{12}$ .

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Problem 7562

Find the missing values in the area model for the expression $0(8w + 10)$ .

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Problem 7563

Find the least common denominator (LCD) for $\frac{1}{2}$ and $\frac{3}{8}$ . Choices: 4, 8, 2, 16, 24.

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Problem 7564

Create an expression for 250 minutes left if you talk 1 hour (60 minutes) per week: $250 - 60w$ , where $w$ is weeks.

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Problem 7565

Convert $17.27 \mathrm{~cm}$ to inches. Options: 43.865, 6.799, 172.7, 0.06799.

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Problem 7566

Find the area of a rectangle with length $\frac{3}{4} \mathrm{ft}$ and width $\frac{2}{3} \mathrm{ft}$ .

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Problem 7567

Simplify the expression: $0.5 x - x$ .

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Problem 7568

Simplify $5a - a$ where "a" is a variable.

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Problem 7569

10. A fruit fly is an $F_{1}$ offspring of two true-breeding parents for body color and wing length (GGLL $\times$ ggll). The $F_{1}$ fly is a heterozygote for both gray body and long wings (GgLI). The heterozygous fly mates with a beautiful female that is stunningly homozygous recessive for body color (black) but homozygous dominant for wing length (long). What are the phenotypes and genotypic ratio of the $\mathrm{F}_{2}$ offspring from this mating? Remember that the genes for body color and wing length are linked! $F_{2}$ phenotypes: $\qquad$ $\qquad$ $F_{2}$ genotypic ratio: $\qquad$

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Problem 7570

Si représente 1 et que la couleur jaune représente des quantités négatives, détermine l'opposé de l'expression représentée par chacun de ces schémas. Exprime tes réponses avec des schémas et des symboles. a) b)

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Problem 7571

11. Quel est l'opposé de ces expressions? a) $3 x-7$ b) $4 g^{2}-4 g+2.5$ c) $v^{2}+8 v-1$

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Problem 7572

12. Laquelle de ces réponses représente l'opposé de $2 x^{2}-x$ ? A $-2 x^{2}-x$ B
C $\square$ D $2 x^{2}+x$

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Problem 7573

13. Modélise cette soustraction $\left(-3 x^{2}+4 x\right)-\left(-2 x^{2}-x\right)$ à l'aide d'un schéma.

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Problem 7574

17. Complète la pyramide d'additions. Pour trouver la valeur à écrire dans une case, additionne les expressions qui sont dans les deux cases situées juste en dessous.

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Problem 7575

$\log _{a} b^{3}+4 \log _{a}\left(a c^{3}\right)-7$ , where $a, b, c>1$ , written as a single logarithm, is $\log _{a}\left(b^{3} c^{3}\right)$ $\log _{a}\left(\frac{b c}{a^{4}}\right)$ $\log _{a}\left(\frac{b^{3} c^{12}}{a^{4}}\right)$ $\log _{a}\left(\frac{b^{3} c^{12}}{a^{3}}\right)$

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Problem 7576

Answer the questions below about Line 1 and Line 2 shown below. \begin{tabular}{ll} $4+2$ \\ $2+4$ & Line 1 \\ Line 2 \end{tabular}
Answer Attempt 1 out of 2
The expression was rewritten using the $\square$ Line 1 says $\square$ $+$ $\square$ , which could be represented using dots as $\bullet \bullet \bullet+\bullet \bullet$ for a total of $\square$ dots.
Line 2 says $\square$ $+$ $\square$ , which could be represented using dots as $\bullet \bullet+\bullet \bullet \bullet$ for a total of $\square$ dots.

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Problem 7577

Suppose $\log a=-6, \log b=2, \log c=3$ . Find $\log \left(\frac{a^{2}}{b^{5} c^{3}}\right)$ . $\log \left(\frac{a^{2}}{b^{5} c^{3}}\right)=$ $\square$

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Problem 7578

Halla el cociente. $\begin{array}{r} 64.48 \div 16 \\ 64.48 \div 16= \end{array}$

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Problem 7579

Alexander finalizó su reseña de un libro en 429 minutos. ¿Aproximadamente cuántas horas son?
Alexander tardó en completar su reseña de un libro aproximadamente $\square$ horas.

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Problem 7580

Answer the questions below about Line 1 and Line 2 shown below. \begin{tabular}{ll} $2+6$ & Line 1 \\ $6+2$ & Line 2 \end{tabular}
Answer Attempt 1 out of 2
The expression was rewritten using the $\square$
Line 1 says $\square$ $+$ $\square$ , which could be represented using dots as $\bullet \bullet+\bullet \bullet \bullet \bullet \bullet$ for a total of $\square$ dots.
Line 2 says $\square$ $+$ $\square$ , which could be represented using dots as $\bullet \bullet \bullet \bullet \bullet \bullet+\bullet \bullet$ for a total of $\square$ dots.

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Problem 7581

8. Write each expression as a single trigonometric function. a) $\sin 28^{\circ} \cos 35^{\circ}+\cos 28^{\circ} \sin 35^{\circ}$ b) $\cos 10^{\circ} \cos 7^{\circ}-\sin 10^{\circ} \sin 7^{\circ}$ d) $\sin \frac{\pi}{3} \cos \frac{\pi}{4}-\cos \frac{\pi}{3} \sin \frac{\pi}{4}$

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Problem 7582

Question Watch Video Show Examples
Use the long division method to find the result when $6 x^{3}-7 x^{2}+23 x-7$ is divided by $3 x-2$ . If there is a remainder, express the result in the form $q(x)+\frac{r(x)}{b(x)}$ .
Answer Attempt 1 out of 2 $\square$ Submit Answer

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Problem 7583

Question Watch Video Show Examples
Use the long division method to find the result when $x^{4}-7 x^{3}-29 x^{2}+17 x-3$ is divided by $x^{2}-10 x+2$ . If there is a remainder, express the result in the form $q(x)+\frac{r(x)}{b(x)}$ .
Answer Attempt 1 out of 2 $\square$ Submit Answer

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Problem 7584

a) $\begin{array}{l|l} C= & A= \\ C= & A= \end{array}$

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Problem 7585

For the following conversion: $6 \times 10^{-1} \mathrm{~km}=? \mathrm{~nm}$
In order, in the blanks below:
1. Report the orders of magnitude between the two prefixes. Report as a positive number. For instance there are 10 orders of magnitude between deci and giga.
2. Write the conversion factor. For instance $1 \mathrm{~kg} / 10^{\wedge} 3 \mathrm{~g}$
3. Write the final answer. If the conversion is given in scientific notation, write the answer in scientific notation, using the correct number of significant digits.

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Problem 7586

Question Watch Video Show Examples
Use the long division method to find the result when $4 x^{4}-8 x^{3}+x^{2}+7 x-11$ is divided by $2 x^{2}-x-5$ . If there is a remainder, express the result in the form $q(x)+\frac{r(x)}{b(x)}$ .
Answer Attempt 1 out of 2 $\square$ Submit Answer

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Problem 7587

Answer the questions below about Line 1 and Line 2 shown below. $\begin{array}{c} 7 \cdot(2+1) \\ 7 \cdot 2+7 \cdot 1 \end{array}$ Line 1 Line 2
Answer Attempt 1 out of 2
The expression was rewritten using the $\square$ $7 \cdot(2+1)$ equals $7 \cdot$ $\square$ which equals $\square$ . $7 \cdot 2+7 \cdot 1$ equals $\square$ $+$ $\square$ which equals $\square$ .

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Problem 7588

Answer the questions below about Line 1 and Line 2 shown below. \begin{tabular}{ll} $1+5$ & Line 1 \\ $5+1$ & Line 2 \end{tabular}
Answer Attempt 1 out of 2
The expression was rewritten using the $\square$
Line 1 says $\square$ $+$ $\square$ , which could be represented using dots as $\bullet+\bullet \bullet \bullet \bullet \bullet$ for a total of $\square$ dots.
Line 2 says $\square$ $+$ $\square$ , which could be represented using dots as $\bullet \bullet \bullet \bullet \bullet+\bullet$ for a total of $\square$ dots.

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Problem 7589

62 26 mph (4) myth (1) 4 mph
Q 30 minh

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Problem 7590

Answer the questions below about Line 1 and Line 2 shown below. $\begin{array}{l} (8+7)+3 \\ 8+(7+3) \end{array}$
Line 1
Line 2
Answer Attempt 1 out of 2
The expression was rewritten using the $\square$ $(8+7)+3$ equals $\square$ +3 which equals $\square$ . $8+(7+3)$ equals $8+$ $\qquad$ which equals $\square$ .

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Problem 7591

Tyler is on his school's swim team. During his 2-week winter break, he swims 30 laps each week to stay in shape. If each lap is 25 yards, how many feet does he swim during his winter break?

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Problem 7592

Divide. $2 \frac{2}{3}+1 \frac{1}{4}=$
Select the correct answer. $2 \frac{1}{5}$ $1 \frac{13}{15}$ $3 \frac{1}{3}$ $2 \frac{2}{15}$

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Problem 7593

$\int \frac{50 x+6}{(7 x+1)(x-1)} d x$ $\square$
Need Help? Read It Watch It Submit Answer 3. [-/1 Points] DETAILS MY NOTES SCALCET9 7.4.012.

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Problem 7594

Halla el cociente. \begin{array}{r} 6 5 \longdiv { 9 3 7 } \\ 937 \div 65= \end{array} $\square$ (Escr

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Problem 7595

10) $4 x^{2} \cdot 3 x$ 11) $\frac{2 n^{2}}{n}$ 12) $\left(2 x^{4} y^{4}\right)^{4}$ 13) $v^{3} \cdot 10 u^{3} v^{5} \cdot 8 u v^{3}$ 14) $\frac{(7)^{3}(5)^{2}(7)(5)^{3}}{(7)^{4}(5)^{4}}$ 15) $\left(4 n^{3} \cdot n^{2}\right)^{2}$ 16) $\frac{2 x^{2} y^{4} \cdot 4 x^{2} y^{4} \cdot 3 x}{3 x^{-3} y^{2}}$ 17) $\frac{\left(2 x^{3} z^{2}\right)^{3}}{x^{3} y^{4} z^{2} \cdot x^{-4} z^{3}}$

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Problem 7596

A student with mass $m$ runs and jumps onto the outer edge of a stationary horizontal platform that is free to rotate about an axis at the center of the platform. The platform has mass $M$ , radius $R$ , and rotational inertia $\frac{1}{2} M R^{2}$ . Immediately before landing on the platform the student has horizontal speed $v$ directed tangentially to the outer edge of the platform. Which of the following is equal to the angular momentum of the student about the platform's axis immediately before landing on the platform? (A) $\frac{1}{2} R m v$ (B) Rmv (C) $\frac{1}{2} R M v$ (D) $R M v$

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Problem 7597

Halla el cociente. 6 5 \longdiv { 9 3 7 } $937 \div 65=$ $\square$ (Escribe un número entero, una fracción propia o un número mixto).

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Problem 7598

1 point)
Simplify each expression $\sqrt[3]{-80}$ by writing in simplest radical form $A \sqrt[3]{C}$ . Answer: $A=$ $\square$ and $C=$ $\square$

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Problem 7599

What is the conjugate acid of $\mathrm{HPO}_{3}{ }^{2-}$ ? Express your answer as a chemical formula. View Available Hint(s) $\square$ Aг $\phi$ $x^{a}$ $x_{b}$ a $\frac{a}{b}$ $\bar{x}$ $\rightarrow$ $\rightleftharpoons$ - (x) A chemical reaction does not occur for this question.

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Problem 7600

lect the equivalent expression. $\left(s^{-7} \cdot s^{6}\right)^{\frac{1}{2}}$
Answer $\sqrt{s}$ $s^{2}$ $\frac{1}{s^{2}}$ $\frac{1}{\sqrt{s}}$
You have up to 7 questions left to raise your score.

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1 ...73 74 75 76 77 78 79 ...144

Expression

Problem 7501

Find the average daily pay for Ben, given his earnings: \$78, \$94, \$115, \$108, \$67, \$78.

Problem 7502

Calculate the value of −393\frac{-39}{3}3−39​.

Problem 7503

Evaluate 2x+7+8x2x + 7 + 8x2x+7+8x at x=−4x = -4x=−4 and simplify.

Problem 7504

Identify the first step to simplify the expression: 4−5(3x+3)4-5(3 x+3)4−5(3x+3).

Problem 7505

Simplify the expression: −3(2−x)−2(4x−10)-3(2-x)-2(4x-10)−3(2−x)−2(4x−10)

Problem 7506

Simplify f(x+h)−f(x)h\frac{f(x+h)-f(x)}{h}hf(x+h)−f(x)​ for f(x)=8x+6f(x)=8x+6f(x)=8x+6.

Problem 7507

Simplify the expression by combining like terms: −3x−x2+9x\frac{-3 x - x}{2} + 9 x2−3x−x​+9x

Problem 7508

Calculate the area of a rectangle with length 15 cm and width 9 cm using the formula A=l×wA = l \times wA=l×w.

Problem 7509

Calculate the expression: (8×1)+(5×1100)+(9×11,000)(8 \times 1) + (5 \times \frac{1}{100}) + (9 \times \frac{1}{1,000})(8×1)+(5×1001​)+(9×1,0001​).

Problem 7510

Find the value of w−2w - 2w−2 when w=8w = 8w=8.

Problem 7511

Find the difference between the record high (109°F) and low (-370°F) temperatures in Fargo, ND.

Problem 7512

Find the total length of two pipes: 4−1/4′4-1/4'4−1/4′ and 3−1/2′3-1/2'3−1/2′. Give the total in fractions of a foot, feet & inches, and inches.

Problem 7513

True or false: Is 7 a natural number? Choose True or False.

Problem 7514

Find the value of 4y+9z4y + 9z4y+9z for y=5y=5y=5 and z=4z=4z=4.

Problem 7515

Find the difference between the record high (109∘F109^{\circ} \mathrm{F}109∘F) and low (−37∘F-37^{\circ} \mathrm{F}−37∘F) temperatures in Fargo, ND.

Problem 7516

Calculate the total weight of 3 orders weighing 5212lbs,12338lbs52 \frac{1}{2} \mathrm{lbs}, 123 \frac{3}{8} \mathrm{lbs}5221​lbs,12383​lbs, and 9678lbs\frac{967}{8} \mathrm{lbs}8967​lbs in lbs and oz.

Problem 7517

Find the remaining width of material after cutting a total width of 6146\frac{1}{4}641​ inches with a saw blade kerf of 18\frac{1}{8}81​ inch.

Problem 7518

Evaluate 4c24 c^{2}4c2 for c=6c=6c=6.

Problem 7519

Find the value of 8z−68z - 68z−6 when z=4z = 4z=4.

Problem 7520

Calculate: 3110+(−1.3)3 \frac{1}{10} + (-1.3)3101​+(−1.3)

Problem 7521

The width of a rectangle is 19 cm less than double the length. If uuu is the length, express the width.

Problem 7522

Find the distance between the centers of two holes drilled in a 10-1/4" x 3-1/2" plate, each 7/8"7/8"7/8" from the edges.

Problem 7523

Is the statement true or false? 16\sqrt{16}16​ is an irrational number. Choose: True or False.

Problem 7524

Is it true or false that every real number is an integer? Choose: True or False.

Problem 7525

Is the statement "6 is an integer" true or false? Choose: True or False.

Problem 7526

Is 12\sqrt{12}12​ a rational number? Choose true or false and explain your choice. A. True, it's an integer. B. True, it has repeating digits. C. False, it never ends or repeats. D. True, it's a terminating decimal.

Problem 7527

What is the sum of the temperatures for the 5-day forecast in St. Paul: -6, 3, 4, -2, -1?

Problem 7528

Insert <<< or >>> between 27\frac{2}{7}72​ and 78\frac{7}{8}87​ to make the statement true.

Problem 7529

Calculate the expression: [2×(3+5)+6]×4[2 \times(3+5)+6] \times 4[2×(3+5)+6]×4.

Problem 7530

Classify ∠ABC\angle A B C∠ABC if m∠ABC=160∘m \angle A B C=160^{\circ}m∠ABC=160∘: Right, Straight, Obtuse, or Acute?

Problem 7531

Insert <,><, ><,>, or === in the blank: ∣−25∣□∣−52∣ \left|-\frac{2}{5}\right| \square \left|-\frac{5}{2}\right| ∣∣​−52​∣∣​□∣∣​−25​∣∣​

Problem 7532

Find the absolute value of 2122 \frac{1}{2}221​ and express it as a mixed number in simplest form.

Problem 7533

Find the absolute value of 6. What is ∣6∣|6|∣6∣?

Problem 7534

Simplify -|48|. What is -|48| equal to?

Problem 7535

Find the value of the expression −∣−8∣-|-8|−∣−8∣.

Problem 7536

Calculate the distance UVUVUV between points U(2,−2)U(2,-2)U(2,−2) and V(−5,−3)V(-5,-3)V(−5,−3), rounding to the nearest tenth if needed. UV= UV = UV=

Problem 7537

Find the midpoint MMM of the line segment with endpoints C(5,3)C(5,3)C(5,3) and D(−3,−6)D(-3,-6)D(−3,−6).

Problem 7538

Find the absolute value of 10. What is ∣10∣=|10| =∣10∣=?

Problem 7539

Calculate the sum: 78+49=\frac{7}{8}+\frac{4}{9}=87​+94​=

Problem 7540

Calculate the value of $\frac{-39}{3}$ .

Evaluate $2x + 7 + 8x$ at $x = -4$ and simplify.

Identify the first step to simplify the expression: $4-5(3 x+3)$ .

Simplify the expression: $-3(2-x)-2(4x-10)$

Simplify $\frac{f(x+h)-f(x)}{h}$ for $f(x)=8x+6$ .

Simplify the expression by combining like terms: $\frac{-3 x - x}{2} + 9 x$

Calculate the area of a rectangle with length 15 cm and width 9 cm using the formula $A = l \times w$ .

Calculate the expression: $(8 \times 1) + (5 \times \frac{1}{100}) + (9 \times \frac{1}{1,000})$ .

Find the value of $w - 2$ when $w = 8$ .

Find the total length of two pipes: $4-1/4'$ and $3-1/2'$ . Give the total in fractions of a foot, feet & inches, and inches.

Find the value of $4y + 9z$ for $y=5$ and $z=4$ .

Find the difference between the record high ( $109^{\circ} \mathrm{F}$ ) and low ( $-37^{\circ} \mathrm{F}$ ) temperatures in Fargo, ND.

Calculate the total weight of 3 orders weighing $52 \frac{1}{2} \mathrm{lbs}, 123 \frac{3}{8} \mathrm{lbs}$ , and $\frac{967}{8} \mathrm{lbs}$ in lbs and oz.

Find the remaining width of material after cutting a total width of $6\frac{1}{4}$ inches with a saw blade kerf of $\frac{1}{8}$ inch.

Evaluate $4 c^{2}$ for $c=6$ .

Find the value of $8z - 6$ when $z = 4$ .

Calculate: $3 \frac{1}{10} + (-1.3)$

The width of a rectangle is 19 cm less than double the length. If $u$ is the length, express the width.

Find the distance between the centers of two holes drilled in a 10-1/4" x 3-1/2" plate, each $7/8"$ from the edges.

Is the statement true or false? $\sqrt{16}$ is an irrational number. Choose: True or False.

Is $\sqrt{12}$ a rational number? Choose true or false and explain your choice. A. True, it's an integer. B. True, it has repeating digits. C. False, it never ends or repeats. D. True, it's a terminating decimal.

Insert $<$ or $>$ between $\frac{2}{7}$ and $\frac{7}{8}$ to make the statement true.

Calculate the expression: $[2 \times(3+5)+6] \times 4$ .

Classify $\angle A B C$ if $m \angle A B C=160^{\circ}$ : Right, Straight, Obtuse, or Acute?

Insert $<, >$ , or $=$ in the blank:
$\left|-\frac{2}{5}\right| \square \left|-\frac{5}{2}\right|$

Find the absolute value of $2 \frac{1}{2}$ and express it as a mixed number in simplest form.

Find the absolute value of 6. What is $|6|$ ?

Find the value of the expression $-|-8|$ .

Calculate the distance $UV$ between points $U(2,-2)$ and $V(-5,-3)$ , rounding to the nearest tenth if needed. $UV =$

Find the midpoint $M$ of the line segment with endpoints $C(5,3)$ and $D(-3,-6)$ .

Find the absolute value of 10. What is $|10| =$ ?

Calculate the sum: $\frac{7}{8}+\frac{4}{9}=$

Calculate $\frac{7}{8}+\frac{4}{9}$ .

Calculate $\frac{1}{5}-\frac{1}{7}$ .

Insert $<,>$ , or $=$ to make the statement true: $\frac{1}{11} \cdot \frac{1}{11} \square \frac{1}{11} \div \frac{1}{11}$

Find the absolute value of -3: $|-3| =$

Three students raced 100m. Order their times: Tiana: 13.1s, James: $1 \times 10+3 \times 1+2 \times\left(\frac{1}{10}\right)$ , Dakota: twelve and nine tenths. Options: (A) (B) (C) (D).

Convert the length of a part from $1257 \mathrm{~mm}$ to meters. What is the length in meters?

What is the quotient of $5 \div \frac{1}{4}$ ? (A) $\frac{5}{4}$ (B) $\frac{6}{4}$ (C) 20 (D) 21

Convert the tolerance range of $\pm0.05$ mm to the nearest 0.001 inch.

Create an expression for "the product of 8 and the sum of a number $x$ and 3".

Find the simplified expression for the sum of $(3x - 3)$ and $(-4x - 9)$ .

Convert the tolerance $+/-.125$ inch to mm, rounded to the nearest $1/100$ mm: $3$ mm, $1.25$ mm, $3.17$ mm, or $0.05$ mm?

Calculate $6 \frac{1}{2} \times 3 \frac{3}{4}$ . Choose the correct answer from the options: (A) $16 \frac{5}{8}$ , (B) $18 \frac{3}{8}$ , (C) $22 \frac{1}{2}$ , (D) $24 \frac{3}{8}$ .

Find the least common denominator (LCD) of $\frac{1}{3}$ and $\frac{1}{4}$ .

Find the missing values in the area model for the expression $10(8w + 10)$ .

Convert $2.73 \mathrm{~cm}$ to inches: 0.1074, 1.0704, 01074, or 107.4 inches?

Find the Least Common Denominator (LCD) of $\frac{1}{3}$ and $\frac{1}{4}$ .

Convert these fractions to the least common denominator: $\frac{1}{3}$ , $\frac{1}{4}$ . Choose the equivalent from: a. $\frac{8}{12}$ , b. $\frac{9}{12}$ , c. $\frac{3}{12}$ , d. $\frac{6}{12}$ , e. $\frac{4}{12}$ .

Find the missing values in the area model for the expression $0(8w + 10)$ .

Find the least common denominator (LCD) for $\frac{1}{2}$ and $\frac{3}{8}$ . Choices: 4, 8, 2, 16, 24.

Create an expression for 250 minutes left if you talk 1 hour (60 minutes) per week: $250 - 60w$ , where $w$ is weeks.

Convert $17.27 \mathrm{~cm}$ to inches. Options: 43.865, 6.799, 172.7, 0.06799.

Find the area of a rectangle with length $\frac{3}{4} \mathrm{ft}$ and width $\frac{2}{3} \mathrm{ft}$ .

Simplify the expression: $0.5 x - x$ .

Simplify $5a - a$ where "a" is a variable.

11. Quel est l'opposé de ces expressions? a) $3 x-7$ b) $4 g^{2}-4 g+2.5$ c) $v^{2}+8 v-1$

12. Laquelle de ces réponses représente l'opposé de $2 x^{2}-x$ ? A $-2 x^{2}-x$ B
C $\square$ D $2 x^{2}+x$

13. Modélise cette soustraction $\left(-3 x^{2}+4 x\right)-\left(-2 x^{2}-x\right)$ à l'aide d'un schéma.