Expression

Problem 2801

8. limX01x1+XX=\lim _{X \rightarrow 0} \frac{\sqrt{1-x}-\sqrt{1+X}}{X}=

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Problem 2802

Expand (5+x2)(2+x)(8x)(5+x^2)(2+x)(8-x)

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Problem 2803

Area and Circumference of a Circle - Instruction - Le
The chalk circle around the pitcher's mound has a diameter of 16 ft .
What is the area of the pitcher's circle? A=?8π16π64π256πA=\begin{array}{|l|} \hline ? \\ \hline 8 \pi \\ 16 \pi \\ 64 \pi \\ 256 \pi \\ \hline \end{array}

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Problem 2804

14. Evaluate x4y3x^{4}-y^{3} if x=2x=-2 and y=1y=1. (Example 4)
16. Evaluate (xy)3(x-y)^{3} if x=10x=-10 and y=7y=-7. (Example 5) =2=2.
18. Evaluate (5g4)3h\left(5-g^{4}\right)^{3}-h if g=1g=1 and h=20h=20. (Example 5)

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Problem 2805

=6×1520=6 \times 15-20

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Problem 2806

Look at the number line below. What are the two missing numbers?

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Problem 2807

My Into \square K12 Customer Supp... Newrow Support LogMeln 123 Newrow Test Check K12 K12 Minecraft Education... Office 365 Speedtest What Is My Browser? 11/19 Math
Subtract. 172317 \frac{2}{3} 912-9 \frac{1}{2}

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Problem 2808

13. limx04X3+6x3x3+2x=\lim _{x \rightarrow 0} \frac{4 X^{3}+6 x}{3 x^{3}+2 x}=

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Problem 2809

Divide. 12x54x+124x\frac{12 x^{5}-4 x+12}{4 x}

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Problem 2810

Solve: (2x3)(6x4)\left(2 x^{3}\right)\left(6 x^{4}\right) 8x78 x^{7} 8x128 x^{12} 12x712 x^{7} 12x1212 x^{12}

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Problem 2811

1. 5\sqrt{5} is between 3.

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Problem 2812

An experiment consists of drawing 1 card from a standard 52-card deck. What is the probability of drawing a queen?
The probability of drawing a queen is \square \square. (Type an integer or a simplified fraction.)

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Problem 2813

13/4+23/4=13 / 4+23 / 4=

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Problem 2814

Convert the credit card rate to the APR. Oregon, 114%1 \frac{1}{4} \% per month APR = \square \%
Need Help? \square Read It \square Watch It

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Problem 2815

(5) 18522 doğal sayısının aşağıdaki sayılardan hangisi ile bölümünden kalan 2'dir? A) 3 B) 6 C) 9 D) 10

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Problem 2816

Write expression log(x3y19z16)\log \left(\frac{x^{3} y^{19}}{z^{16}}\right) as a sum or difference of logarithms with no exponents Simplify your answer completely. log(x3y19z16)=\log \left(\frac{x^{3} y^{19}}{z^{16}}\right)= \square
Hint

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Problem 2817

11) a2+10a+21a^{2}+10 a+21 12) n211n+24n^{2}-11 n+24 (a) (a
1 (n)(n(n)(n ) 13) x22x15x^{2}-2 x-15 (x)(x) 14) k22k48k^{2}-2 k-48 15) x25x24x^{2}-5 x-24 16) x2+13x+40x^{2}+13 x+40 (x)(x) (x)(x) ) 17) u2+5uv+4v2u^{2}+5 u v+4 v^{2} (u) uu ) 18) x2+6xy+5y2x^{2}+6 x y+5 y^{2} x\int x γ\gamma 19) 5x270x+2255 x^{2}-70 x+225
1 20) 6x2+30x+366 x^{2}+30 x+36 (x)(x)

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Problem 2818

Which is equivalent to (Hint: Simplify Radical) (2 Points) (16x5)(59x3)\left(\sqrt{16 x^{5}}\right)\left(5 \sqrt{9 x^{3}}\right) 60x460 x^{4} 800x4800 x^{4} 3564x43564 x^{4} 77x477 x^{4}

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Problem 2819

Calculate the area of a rectangle where the top side is 5 feet 9 inches and the side is 1 foot 6 inches.\text{Calculate the area of a rectangle where the top side is } 5 \text{ feet } 9 \text{ inches and the side is } 1 \text{ foot } 6 \text{ inches.}

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Problem 2820

The circular faces of the cylinder below have a radius of 9 cm . Work out the area of one of the circular faces. If your answer is a decimal, give it to 1 d.p.

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Problem 2821

Which is equivalent to 15(6)?-15-(-6) ? A. 15+615+6 B. 15+6-15+6 C. 156-15-6 D. 15615-6

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Problem 2822

Which Road Rule should we use? What is the solution to 12(3)=?-12-(-3)=? A. -9 B. -15 C. 9 D. 15

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Problem 2823

The following figure is made of 1 triangle and 1 rectangle.
Find the area of each part of the figure and the whole figure. \begin{tabular}{ll} Figure & Area (square units) \\ \hline Rectangle A \\ Triangle B \\ Whole figure \end{tabular}

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Problem 2824

Express each of the following as decimals. a. 726\frac{7}{2^{6}} b. 12354\frac{1}{2^{3} \cdot 5^{4}}

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Problem 2825

1 2 3 5 6 7 8 9 AN 5 6
What is the greatest common factor of 3 and 6 ? 3 6 18 36

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Problem 2826

sinθ+tanθ1+secθ\frac{\sin \theta+\tan \theta}{1+\sec \theta}

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Problem 2827

8. Select the correct quotient. 0.01224÷0.00180.01224 \div 0.0018 06.80 6.7 6.8 06.8

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Problem 2828

11. Multiply (2.5)4.13(-2.5) \cdot 4.13 103.25-103.25 10.325 103.25 10.325-10.325

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Problem 2829

Question 1
The image below is a geometric representation of Completing the Square.
Which of the following expressions correctly describes Completing the Square? x2+a+(a2)2x^{2}+a+\left(\frac{a}{2}\right)^{2} x2+2ax+a2x^{2}+2 a x+a^{2} x2+ax+a2x^{2}+a x+a^{2} x2+ax+(a2)2x^{2}+a x+\left(\frac{a}{2}\right)^{2}

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Problem 2830

Actual: 8.74
18. The problem already has the answer. Select the correct sign of the result. Choose the correct decimal by either using estimation or counting decimal places. (1.3)(0.05)=+0065(-1.3) \cdot(-0.05)=+-0065 \square \qquad

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Problem 2831

Fill in the missing digits in the standard addition algorithm below (including carried digits).
You can use tab/shift-tab to move from one box to another.

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Problem 2832

Find the missing angle

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Problem 2833

22. Select the correct answer when the divisor is made into a whole number. 0 . 0 0 5 \longdiv { 5 5 . 2 } \qquad
5 \longdiv { 5 5 . 2 0 0 }
5 \longdiv { 5 . 5 2 0 0 }
5 \longdiv { . 5 5 2 0 0 } 5 \longdiv { 5 5 2 0 0 }

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Problem 2834

22. Select the correct answer when the divisor is made into a whole number. 0 . 0 0 5 \longdiv { 5 5 . 2 } \longrightarrow \qquad
5 \longdiv { 5 5 . 2 0 0 }
5 \longdiv { 5 . 5 2 0 0 }
5 \longdiv { . 5 5 2 0 0 } 5 \longdiv { 5 5 2 0 0 }

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Problem 2835

Simplify the expression as much as possible. sin(2x)cos(x)=\frac{\sin (2 x)}{\cos (x)}= \square help (formulas)

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Problem 2836

24. Select the correct quotient. 2.21÷0.342.21 \div 0.34 5.5 6.5 06.5 006.5

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Problem 2837

Bonus! A palindrome is a string whose reversal is identical to the string. The following are examples of palindromic strings of alphanumeric characters: 010,034430,ABBA,1101011010,034430, \mathrm{ABBA}, 1101011.
An experiment consists of picking at random a bit string (just 0 's and 1 's) of length 13. (a) What is the probability that the randomly selected bit string is a palindrome? (b) What is the probability that the string is not a palindrome? (c) What is the probability that the bits are in non-increasing order (left to right)?

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Problem 2838

7. Event A and Event B are mutually exclusive events. Find P(AP(A or B)B) for each of the following: (a) P(A)=0.35,P(B)=0.12P(A)=0.35, P(B)=0.12 (b) P(A)=14,P(B)=16P(A)=\frac{1}{4}, P(B)=\frac{1}{6} (c) P(A)=322,P(B)=7110P(A)=\frac{3}{22}, P(B)=\frac{7}{110}

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Problem 2839

If the reserve ratio is 10%10 \%, what is the money multiplier?

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Problem 2840

Le espressioni aritmetiche Sottolinea nelle seguenti espressioni le operazioni da svolgere per prime, poi calcola. Segui l'esempio. 6×43015:5=20=24+20=44\begin{array}{l} \frac{6 \times 4}{30-15: 5}=20=24+20=44 \\ \end{array} 40:10+3×4=5+918:9=48:8+910=\begin{array}{l} 40: 10+3 \times 4= \\ 5+9-18: 9= \\ 48: 8+9-10= \end{array}

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Problem 2841

A firm sent out a random sample of 500 shipments in a new type of heavy-duty packaging. Eighteen of them damaged upon arrival at their destinations. Is it appropriate to use the methods of this section to construct a confidence interval for the proportion of shipments in heavy-duty packaging that are damaged upon arrival? If not, explain why not. Yes No, because a sample of size 500 is not large enough. No, because either np^n \hat{p} or n(1p^)n(1-\hat{p}) is less than 10 .

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Problem 2842

Fay thinks that one billion is the same as 102×10710^{2} \times 10^{7} Joe thinks that one billion is the same a 103×10610^{3} \times 10^{6} Explain why they are both correct.

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Problem 2843

Find each coefficient described. 1) Coefficient of x2x^{2} in expansion of (2+x)5(2+x)^{5} 3) Coefficient of xx in expansion of (x+3)5(x+3)^{5} 5) Coefficient of x3y2x^{3} y^{2} in expansion of (x3y)5(x-3 y)^{5}

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Problem 2844

Given that cosθ=25,π2<θ<π\cos \theta=-\frac{\sqrt{2}}{5}, \frac{\pi}{2}<\theta<\pi, find the exact value of each of the following. (a) sin(2θ)\sin (2 \theta) (b) cos(2θ)\cos (2 \theta) (c) sinθ2\sin \frac{\theta}{2} (d) cosθ2\cos \frac{\theta}{2}

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Problem 2845

Saudy Caldereon Figueroa, 417 of 30 25\sqrt{25} 20\sqrt{20} Which number is rational? 24\sqrt{24} Back Nexst

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Problem 2846

Convert to scientific notation. 17,800=17,800= \square \square 7×1057 \times 10^{5}

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Problem 2847

sclentific notation. 9,600,000,000=9,600,000,000=

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Problem 2848

Convert to scientific notation. 0.3=0.3= \square \square 10

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Problem 2849

Convert to scientific notation. 0.000046=0.000046=

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Problem 2850

Convert to standard form. 4×106=4 \times 10^{-6}=

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Problem 2851

Calcola il valore delle espressioni aritmetiche senza parentesi. a. 5+68+203+10050=8015+116+8=23+703+3060+2007=67+2340+1035=\begin{array}{l} 5+6-8+20-3+100-50= \\ 80-15+1-16+8= \\ 23+70-3+30-60+200-7= \\ 67+23-40+10-35= \end{array} b. 5×4+20+6×88+60=5 \times 4+20+6 \times 8-8+60= 9×46+70+8×8100=9 \times 4-6+70+8 \times 8-100= 70:7+455+5×10+1000=70: 7+45-5+5 \times 10+1000= 56:7+6030+36:6+12=56: 7+60-30+36: 6+12=

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Problem 2852

0.00008=0.00008=

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Problem 2853

Answer the following regarding the letters in the word Arizona. a. Determine the ratio of vowels to consonants. b. What is the ratio of consonants to vowels? c. What is the ratio of consonants to letters in the word? a. The ratio of vowels to consonants is \square \square

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Problem 2854

4.677sin294.677 \sin \cdot 29^{\circ}

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Problem 2855

What is the ratio of the number of circles to the number of squares?
The ratio of the number of circles to the number of squares is \square \square

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Problem 2856

Use the substitution u=7x2+2xu=7 x^{2}+2 x to evaluate the following indefinite integral. (14x+2)7x2+2xdx\int(14 x+2) \sqrt{7 x^{2}+2 x} d x

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Problem 2857

Factor Completely 8g3+2g28g28 g^{3}+2 g^{2}-8 g-2
Answer Attempt 1 out of 2

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Problem 2858

Evaluate the given indefinite integrals. a) 6y5dy=+C\int \frac{6}{y^{5}} d y=\square+C, b) (1u1/4+5u)du=+C\int\left(\frac{1}{u^{1 / 4}}+5 \sqrt{u}\right) d u=\square+C. c) 16x5dx=+C\int \frac{1}{6 x^{5}} d x=\square+C.

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Problem 2859

Use exponents to condense the expression below. xxxxxyyyyzzzx \cdot x \cdot x \cdot x \cdot x \cdot y \cdot y \cdot y \cdot y \cdot z \cdot z \cdot z
Answer Attempt 1 out of 2
Type the base, then use the aba^{b} button or use the { }^{\wedge} symbol on your keyboard for th exponent.
Condensed form: \square a4a^{4} Submit Answer Precip on Thursday

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Problem 2860

Name: \qquad 1118202411-18-2024
Chapter 1 \& 3 Review
1. Vertical angles are Qpposite angles. that are congruent.
2. Same - side interior angles are Between the 2 lines on the same side,
3. Alternate interior angles are Between the 2 lines on opposite sides Given the diagram at the right... name the special type of angle.
4. <3&<6<3 \&<6 are \qquad Alt - Int angles.
5. <1&<8<1 \&<8 are Alt-Ext \qquad angles.
6. Using the same diagram, if m<4=85m<4=85^{\circ}, find m<8m<8. m8=85m \angle 8=85^{\circ} because theyre corresponding (congruent)
7. Given the diagram, name the angle in 3 ways. BSTTSβ\begin{array}{l} \angle B S T \\ \angle T S \beta \end{array}
8. A&B\angle A \& \angle B are supplementary. If A=98\angle A=98^{\circ}, find m<Bm<B. 18098=82m82\begin{array}{c} 180-98=82^{\circ} \\ m \angle 82^{\circ} \end{array}
9. C&<D\angle C \&<D are complementary. If <D=22<D=22^{\circ}, find C\angle C. c2c \angle 2 \partial^{\circ} becaus theyre corresponding congruens) The same.

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Problem 2861

Show Examples
Latanya finds some nickels and pennies under the couch cushions. How many coins does she have if she has 90 nickels and 150 pennies? How many coins does she have if she has nn nickels and pp pennies?
Answer Attempt 1 out of 2
Total coins, 90 nickels and 150 pennies: \square Total coins, nn nickels and pp pennies: \square

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Problem 2862

49.63×43\begin{array}{r}49.63 \\ \times \quad 43 \\ \hline\end{array}

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Problem 2863

Juanita says that a scale of 1in.:0.4ft1 \mathrm{in} .: 0.4 \mathrm{ft} is equivalent to the ratio 6in.:2.4ft6 \mathrm{in} .: 2.4 \mathrm{ft}. Do you agree? Explain why or why not.

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Problem 2864

Factor 2m624m5+64m42 m^{6}-24 m^{5}+64 m^{4} completely. 2m624m5+64m4=2 m^{6}-24 m^{5}+64 m^{4}=

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Problem 2865

7. Simplify by removing factors of 1 . y211y+30y2+y30\frac{y^{2}-11 y+30}{y^{2}+y-30}

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Problem 2866

Question Watch Video
Expand the logarithm fully using the properties of logs. Express the final answer logx\log x, and logy\log y. logx3y4\log \frac{x^{3}}{y^{4}}

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Problem 2867

Expand the logarithm fully using the properties of logs. Express the final answer in terms of logx\log x, and logy\log y. logxy2\log \frac{x}{y^{2}}

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Problem 2868

Luke drew a scale drawing of a restaurant. He used the scale 3 centimeters =1=1 meter. What is the drawing's scale factor?
Simplify your answer and write it as a fraction.

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Problem 2869

1 serving of cereal contains 15 grams of sugar. How many grams of sugar will 4 servings have?

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Problem 2870

Kristen made a scale drawing of an apartment. The broom closet, which is 6 feet long in real life, is 3 inches long in the drawing. What is the scale factor of the drawing?
Simplify your answer and write it as a fraction.

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Problem 2871

Simplify. x7x5\frac{x^{7}}{x^{5}}

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Problem 2872

Fully factorise 8x+24y+16z8 x+24 y+16 z

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Problem 2873

Simplify. (4v)2(4 v)^{2}
Write your answer without parenthese

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Problem 2874

Exercice 1:
AMN est un triangle rectangle en M . Les mesures nécessaires sont sur la figure. 11^{\circ} ) Calculer la longueur du segment [AN] Justifier votre calcul par une propriété. 22^{\circ} ) Le triangle ABC est-il rectangle ? Justifier.
Sur la figure ci-contre, ABCD est un rectangle mais le dessin n'a pas été exécuté en vraies grandeurs. Les dimensions sont en centimètres. 1) Calculer les longueurs MN, MC puis NC. 2) Le triangle MNC est-il rectangle?
Justifier votre réponse 3) Calculer l'aire du triangle AMN .
Exercice 3:
ABCDEFGH est un parallélépipède rectangle. On donne : AB=4 cm;BC=3 cm\mathrm{AB}=4 \mathrm{~cm} ; \mathrm{BC}=3 \mathrm{~cm} et BF=6 cm\mathrm{BF}=6 \mathrm{~cm}. 1) Calculer et donner les valeurs exactes de AF2,FC2A F^{2}, F C^{2} et AC2A C^{2}. 2) Le triangle AFC est-il rectangle? Justifier ce résultat.

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Problem 2875

Fully factorise 40p2+2440 p^{2}+24

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Problem 2876

An elder spent 10 hours tracking 5 elk. It was raining during 13\frac{1}{3} of that time. How long was it raining?

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Problem 2877

Find cotθ,secθ\cot \theta, \sec \theta, and cosθ\cos \theta, where θ\theta is the angle shown in the figure. Give exact values, not decimal approximations. secθ=cosθ=\begin{array}{l} \sec \theta= \\ \cos \theta= \end{array}

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Problem 2878

(c) 359113=3 \frac{5}{9}-1 \frac{1}{3}=

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Problem 2879

The table shows the number of minutes Alexis spent studying for final exams. The total number of minutes she studied can be represented by 3m+1503 m+150. \begin{tabular}{|l|c|} \hline \multicolumn{1}{|c|}{ Class } & Time (minutes) \\ \hline Math & 3(m+15)3(m+15) \\ \hline Reading & mm \\ \hline Science & 5(m10)5(m-10) \\ \hline Social Studies & 35 \\ \hline \end{tabular}
What is the ratio of the number of minutes Alexis studied for science to the number of minutes she studied for math? Write your answer as a fraction in simplest form.

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Problem 2880

(0) 65\sqrt{65}; 11) 80\sqrt{80}; 12) 75\sqrt{75}, (4) 44\sqrt{44}; 15) 69\sqrt{69}; 16) 68\sqrt{68}; 18) 225\sqrt{225} 19) 98\sqrt{98}; 20) 400\sqrt{400}

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Problem 2881

Expand Condense: (29) log96x3y5z\log _{9} 6 x^{3} y^{5} z (39) 3log5x12log5(6x)3 \log _{5} x-\frac{1}{2} \log _{5}(6-x) (31) log3p2q3q15\log _{3} \frac{p^{2} q}{\sqrt[5]{3 q^{-1}}} (40) 5log7(2x)13log7(5x+1)5 \log _{7}(2 x)-\frac{1}{3} \log _{7}(5 x+1) (33) log11ab4c12d7\log _{11} a b^{-4} c^{12} d^{7} (41) 7log3a+log3b2log3(8c)7 \log _{3} a+\log _{3} b-2 \log _{3}(8 c) (35) log410t2uv3\log _{4} 10 t^{2} u v^{-3} (42) 4ln(x+3)15ln(4x+7)4 \ln (x+3)-\frac{1}{5} \ln (4 x+7)
Expand 9x2yz39 x^{2} y z^{3} (72) ln1(y5)4\ln \frac{1}{(y-5)^{4}}

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Problem 2882

Find the sum of 15+(13)15+(-13)

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Problem 2883

Transformar 330330^{\circ} a radlanes

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Problem 2884

4/224 / 22
The mean of a data set can be found by... choosing the number that occurs most finding the sum of the numbers and then dividing by the total amount of numbers in the data set choosing the middle number subtracting the minimum from the maximum Anjeska Perez*

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Problem 2885

Check
1. In each expression, circle what you will do first. a) 7+2×(3)-7+2 \times(-3)

Add Multiply b) 3×(10÷2)(4)3 \times(-10 \div 2)-(-4)
Multiply Divide Subtract c) 194×32÷619-4 \times 3^{2} \div 6
Subtract Multiply Power Divide d) 30÷510×2-30 \div 5-10 \times 2
Divide Subtract Multiply
2. Evaluate. a)  b) 17+4×3=17+= b) 16÷4+24÷(8)=+24÷(8)=+= c) 32+42÷8÷(5)+÷8÷(5)==9++(5)=+(5)=\begin{array}{l} \text { b) } \\ -17+4 \times 3 \\ =-17+ \\ = \\ \text { b) }-16 \div 4+24 \div(-8) \\ = \\ +24 \div(-8) \\ = \\ +\square \\ = \\ \text { c) } 3^{2}+4^{2} \div 8 \div(-5) \\ +\quad \div 8 \div(-5) \\ = \\ =9+\ldots+(-5) \\ =\quad+(-5) \\ = \end{array}

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Problem 2886

In 1960, the population of Earth reached 3,000,000,000.3,000,000,000 .
Convert this population to standard form.

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Problem 2887

Convert the measurement as indicated. 79 cups to quarts

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Problem 2888

6. (10 pts.) Simplify as indicated. a. Expand the expression as a sum, difference, and/or constant multiple of logarithms. log3((x+2)5yz2)\log _{3}\left(\frac{(x+2)^{5} \sqrt{y}}{z^{2}}\right) b. Condense the expression into a single logarithm of a single quantity. 12log(x5)+4log(x6)8log(x)\frac{1}{2} \log (x-5)+4 \log (x-6)-8 \log (x)

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Problem 2889

In a room of 101 people, the probability that everyone has a different birthday is approximately 2.23×1072.23 \times 10^{-7}.
Write this probability as an ordinary number, giving your answer as a decimal.

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Problem 2890

Generate Equivalent Expressions Quick Check
Apply the properties of operations to determine which expression is equivalent to a+b+c(d+2)a+b+c(d+2). (1 point) a+b+cd+ca+b+c d+c 2abcd2 a b c d a+b+cd+2a+b+c d+2 a+b+cd+2ca+b+c d+2 c

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Problem 2891

Convert the following measurement. 0.74 liters to kiloliters

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Problem 2892

(14) Reason Abstractly Write an expression in simplest form for the perimeter of each figure. 12. 13. 14.

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Problem 2893

How can properties of operations help to generate equivalent expressions that can be used in solving problems?

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Problem 2894

Parallel \& Perpendicular Lines
If the line AA has a slope of 3/5-3 / 5, then the slope perpendicular to it will be.... * 1 point 3 5-5 3/5-3 / 5 3/53 / 5 5/3-5 / 3 5/35 / 3
If the line AA has a slope of 3/5-3 / 5, then the slope parallel to it will be.... * 1 point 3 5-5 3/5-3 / 5 3/53 / 5 5/3-5 / 3 5/35 / 3

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Problem 2895

15/22
There can be more than one mean
True False Anjeska Perez { }^{*}

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Problem 2896

Evaluate each expression. (a) log818=8\log _{8} \frac{1}{8}=-8 (b) log381=\log _{3} 81=

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Problem 2897

Convert to radians: 30 degrees, 18 turns, 3.5 revolutions, 100 degrees

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Problem 2898

Determine whether each of the following values are equivalent to the expression 1712÷517 \frac{1}{2} \div 5. \begin{tabular}{|c|c|c|} \hline Value & Equivalent & Not Equivalent \\ \hline72\frac{7}{2} & & \\ \hline165\frac{16}{5} & & \\ \hline3510\frac{35}{10} & & \\ \hline 3123 \frac{1}{2} & & \\ \hline 3253 \frac{2}{5} & & \\ \hline 35103 \frac{5}{10} & & \\ \hline \end{tabular}

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Problem 2899

45x13y255x4y12=\frac{45 x^{13} y^{25}}{5 x^{4} y^{12}}=

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Problem 2900

If you have 8g8 g of a radioactive element, there will be \qquad of the radioactive element left after one half-life.( time =1=1 year ) a 2 grams b 8 grams c 6 grams d 4 grams

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