Expression

Problem 3201

Directions Factor each trinomial. Identify the binomial factors from below and record the number with the color. Color the picture according to your answers. Staple all work to this paper. Trinomial A: 2x²+5x-42 Trinomial C: 4x²+5x+1 Trinomial B: 5x2 +14x-3 Trinomial D: 3x²-25x-18 Trinomial E: 3x²+16x+16 Trinomial F: 10x²-3x-4 Trinomial G: 2x²-5x+3 Trinomial H: 12x²-13x+3 Trinomial : 6x2-x-15 Trinomial J: 5x²-13x+6 Trinomial K: 2x²+9x+10 Trinomial L: 6x²+31x+5

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Problem 3202

Which of the following is equivalent to log9W\log 9 W ? log9+logw\log 9+\log w log9logw\log 9-\log w w(log9)w(\log 9) 9(logw)9(\log w)

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Problem 3203

Which expression is equivalent to log12(128w)\log _{12}\left(\frac{\frac{1}{2}}{8 w}\right) ? log128log1212+log12w\log _{12} 8-\log _{12} \frac{1}{2}+\log _{12} w log1212(log128+log12W)\log _{12} \frac{1}{2}-\left(\log _{12} 8+\log _{12} W\right) log1212log128+log12w\log _{12} \frac{1}{2}-\log _{12} 8+\log _{12} w log1212log128+log12w\log _{12} \frac{1}{2}-\log _{12} 8+\log _{12} w

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Problem 3204

2 Calculer la valeur absolue de chacun des nombres suivants : 1a=321^{\circ} a=\sqrt{3}-2 5e=(1)135^{\circ} e=(-1)^{13} 2b=132^{\circ} b=1-\sqrt{3} 3c=1743^{\circ} c=\sqrt{17}-4 6f=1046^{\circ} f=10^{-4} 4d=π3,254^{\circ} \quad d=\pi-3,25 7g=4+2x27^{\circ} g=4+2 x^{2} 8h=(1+x)28^{\circ} h=(1+x)^{2}.

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Problem 3205

Given log320.631\log _{3} 2 \approx 0.631 and log371.771\log _{3} 7 \approx 1.771, what is log314\log _{3} 14 ? 1.118 1.893 2.402 3.542

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Problem 3206

Simplify 1520\frac{15}{20} \square

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Problem 3207

What is 2(log38+log3z)log3(3472)2\left(\log _{3} 8+\log _{3} z\right)-\log _{3}\left(3^{4}-7^{2}\right) written as a single logarithm? log32z\log _{3} 2 z log32z2\log _{3} 2 z^{2} log3z24\log _{3} \frac{z^{2}}{4} log364z28149\log _{3} \frac{64 z^{2}}{\frac{81}{49}}

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Problem 3208

Complete the additions. Give your answers as improper fractions and mixed numbers. a) 45+54=\frac{4}{5}+\frac{5}{4}= \square c) 98+89=\frac{9}{8}+\frac{8}{9}= \square \square b) 23+32=\frac{2}{3}+\frac{3}{2}= \square d)  d) =53+35\text { d) } \square=\frac{5}{3}+\frac{3}{5}

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Problem 3209

Which expression is equivalent to log84a(b4c4)\log _{8} 4 a\left(\frac{b-4}{c^{4}}\right) ? log84+log8alog8(b4)4log8c\log _{8} 4+\log _{8} a-\log _{8}(b-4)-4 \log _{8} c log84+log8a+(log8(b4)4log6c)\log _{8} 4+\log _{8} a+\left(\log _{8}(b-4)-4 \log _{6} c\right) log84a+log8b44log8c4\log _{8} 4 a+\log _{8} b-4-4 \log _{8} c-4 log84alog8(b4)log84c\log _{8} 4 a-\log _{8}(b-4)-\log _{8} 4 c

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Problem 3210

x3x4+6dx=\int x^{3} \sqrt{x^{4}+6} d x=

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Problem 3211

Use this definition with right endpoints to find an expression for the area under the graph of ff as a limit. Do not evaluate the limit. f(x)=xx3+5,1x4A=limni=1n\begin{array}{l} f(x)=x \sqrt{x^{3}+5}, 1 \leq x \leq 4 \\ A=\lim _{n \rightarrow \infty} \sum_{i=1}^{n} \square \end{array} Need Help? Read It

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Problem 3212

Consider the following iteration statement: ``` int own = 1; int lcv = 10; while ( lcv >= 0) { own+=2; lcv--; ``` }
What is the value of own after the for loop terminates? own=23o w n=23 own =11 own=21o w n=21

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Problem 3213

Factor the following expression completely: y22y80=y^{2}-2 y-80= \square

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Problem 3214

Factor the following expression completely: 4w244w+112=4 w^{2}-44 w+112= \square

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Problem 3215

cosine and cotangent of π3\frac{\pi}{3}

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Problem 3216

Given that cosθ=33,π2<θ<π\cos \theta=-\frac{\sqrt{3}}{3}, \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 3217

Factor the following expression completely: 5x465x3+200x2=5 x^{4}-65 x^{3}+200 x^{2}= \square

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Problem 3218

Factor: x2+11x+28x^{2}+11 x+28

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Problem 3219

Submit Answer 9. [-/1 Points] DETAILS MY NOTES
Use this definition with right endpoints to find an expression for the area under the graph of ff as a limit. Do not evaluate the limit. f(x)=x2ex,0x5A=limni=1n()\begin{array}{r} f(x)=x^{2} e^{x}, \quad 0 \leq x \leq 5 \\ A=\lim _{n \rightarrow \infty} \sum_{i=1}^{n}(\square) \end{array}

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Problem 3220

Factor 36x24936 x^{2}-49

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Problem 3221

Find the measure of 6\measuredangle 6. 6=[?]\triangle 6=[?]^{\circ}

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Problem 3222

Fill in the gaps to factorise this expression. x2+4x=x(_+)x^{2}+4 x=x\left(\_+\square\right)

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Problem 3223

(A) ln(54)\ln \left(\frac{5}{4}\right)
2. (4 points) Expand the following logarithmic expression as much as possible. log3(9(x216)x+25)\log _{3}\left(\frac{9\left(x^{2}-16\right)}{\sqrt{x+25}}\right)

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Problem 3224

\#4 Evaluate the expression below when m=15m=15 and n=3n=3 3m+2n3(15)+2(3)\begin{array}{l} 3 m+2 n \\ 3(15)+2(3) \end{array}

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Problem 3226

Kuta Software - Infinite Algebra 1 Simplifying Radical Expressions Simplify. 1) 125n\sqrt{125 n}

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Problem 3227

3) 512k2\sqrt{512 k^{2}}

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Problem 3228

4) 512m3\sqrt{512 m^{3}}

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Problem 3229

Apply the properties of operations to multiply. 18x47x18x47x=\begin{array}{l} \frac{1}{8} x \cdot \frac{-4}{7} x \\ \frac{1}{8} x \cdot \frac{-4}{7} x= \end{array} \square

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Problem 3230

2. Write 322532^{-\frac{2}{5}} without using exponents or radicals.

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Problem 3231

(
3. It is estimated that 58%58 \% of students attended a pep rally before school. What decimal equivalent to 58%58 \% ?

Enter your answer in the space provided. \square
Clear All

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Problem 3232

719+(319)-\frac{7}{19}+\left(-\frac{3}{19}\right)

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Problem 3233

2. Add/Subtract using the proper (a) (2 Points) 3i+24i+16(48i)-3 i+2-4 i+16-(4-8 i) 15i+22-15 i+22 i+14i+14 i+14-i+14 15i2215 i-22

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Problem 3234

Multiply. Show Your Work. 15.05×41=15.05 \times 41=

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Problem 3235

(357) 59;833;32\sqrt[9]{5} ; \sqrt[3]{\frac{8}{3}} ; \sqrt{\frac{3}{2}}. 35826;538;324358 \sqrt[6]{2} ; \quad \sqrt[8]{\frac{5}{3}} ; \quad \sqrt[4]{\frac{3}{2}}.

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Problem 3236

i3\sqrt[3]{i}

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Problem 3237

A rectangular bin has the following dimensions. Write a formula that represents the volume, V , of the bin. V=V= \square (Simplify your answer. Do not factor.)

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Problem 3238

An experiment consists of drawing 1 card from a standard 52-card deck. What is the probability of drawing a jack?
The probability of drawing a jack is 413\frac{4}{13} (Type an integer or a simplified fractions)

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Problem 3239

10) 200m4n\sqrt{200 m^{4} n}

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Problem 3240

The partial work to simplify the expression 972\sqrt{972} is shown. Complete the work. 972=3=33=183\begin{aligned} \sqrt{972} & =\sqrt{\square} \cdot \sqrt{\square} \cdot \sqrt{3} \\ & =\square \cdot 3 \cdot \sqrt{3} \\ & =18 \sqrt{3} \end{aligned}

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Problem 3241

12) 64m3n3\sqrt{64 m^{3} n^{3}}

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Problem 3242

When 3+4i2+i\frac{3+4 i}{2+i} is expressed in the form a+bia+b i, what is the value of aa ? 3 1 2 4 32\frac{3}{2}

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Problem 3243

12k2m84k5m5\frac{12 k^{2} m^{8}}{4 k^{5} m^{5}}

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Problem 3244

log4(x3y2)2+6log4x2y5+log4(1x6y2)d)4log6x2ylog6x3y5log6x3y84\left.\log _{4}\left(x^{3} y^{2}\right)^{2}+6 \log _{4} x^{2} y^{5}+\log _{4}\left(\frac{1}{x^{6} y^{2}}\right) d\right) 4 \log _{6} x^{2} y-\log _{6} x^{3} y^{5}-\log _{6} \sqrt[4]{x^{3} y^{8}}

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Problem 3245

Complete the sentence below. The linear correlation coefficient is always between \square and \square inclusive. (Type integers or decimals. Use ascending order.)

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Problem 3246

Write the expression as a single logarithm with coefficient 1 . Assume all variables represent positive real numbers. 5) 29logn4y+87logn(16y2)\frac{2}{9} \log _{n} 4 y+\frac{8}{7} \log _{n}\left(16 y^{2}\right) 5) \qquad A) logn(64y9/10)\log _{n}\left(64 y^{9 / 10}\right) B) logn(439/20y63/40)\log _{n}\left(4^{39 / 20} y^{63 / 40}\right) C) logn(4158/63y158/63)\log _{n}\left(4^{158 / 63} y^{158 / 63}\right) D) logn(64y39/40)\log _{n}\left(64 y^{39 / 40}\right)

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Problem 3247

350.4\frac{3}{5}-0.4

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Problem 3248

d 25522010+(210153040)\frac{2 \sqrt{5}}{5 \sqrt{2}}-\frac{20}{\sqrt{10}}+\left(\frac{2 \sqrt{10}}{15}-\frac{30}{\sqrt{40}}\right).

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Problem 3249

Find three-fourths of twelve.

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Problem 3250

Factor the expression completely where a1 a \neq 1 :
4x26xy+30y2 4x^{2} - 6xy + 30y^{2}

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Problem 3252

1o. Calculați:  a (13+12)6(15+13)15+(1215)10\text { a }\left(\frac{1}{\sqrt{3}}+\frac{1}{\sqrt{2}}\right) \cdot \sqrt{6}-\left(\frac{1}{\sqrt{5}}+\frac{1}{\sqrt{3}}\right) \cdot \sqrt{15}+\left(\frac{1}{\sqrt{2}}-\frac{1}{\sqrt{5}}\right) \cdot \sqrt{10} \text {; }

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Problem 3253

Provincial Park. The store sells a case of 12 bottles of water for $8.50\$ 8.50 and individual bottles of the same brand of water for $1.55\$ 1.55. cosd 12 ladstes =12×$155==12 \times \$ 155= a) Approximately how much does each bottle of water in the case of 12 cost? (2) =18.60=18.60 b) How much would a customer save by buying a case of water, rather than 12 individual bottles? (2)

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Problem 3254

27218\sqrt{27} \cdot 2 \sqrt{18}

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Problem 3255

Simplify. Enter the result as a single logarithm with a coefficient of 1. log4(11x)+log4(6x2)=\log _{4}(11 x)+\log _{4}\left(6 x^{2}\right)= \square Calculator
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Problem 3256

If a fair coin is tossed 4 times, what is the probability, to the nearest thousandth, of getting exactly 1 heads?

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Problem 3257

Which expression shows 7+217+21 written as a product of two factors? 7(3+3)7(3+3) 7(1+3)7(1+3) 3(1+7)3(1+7) 3(3+7)3(3+7)

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Problem 3258

I'm sorry, but I can't assist with that request.

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Problem 3259

Does the quotient have a remainder? Choose Yes or No. \begin{tabular}{|l|l|l|} \cline { 2 - 3 } \multicolumn{1}{c|}{} & Yes & No \\ \hline 1,000÷601,000 \div 60 & & \\ \hline 5,000÷205,000 \div 20 & & \\ \hline 9,495÷159,495 \div 15 & & \\ \hline 7,005÷257,005 \div 25 & & \\ \hline \end{tabular}

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Problem 3260

The radius of a circle is 3 feet. What is the circle's circumference?
Use π3.14\pi \approx 3.14 and round your answer to the nearest hundredth. \square feet

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Problem 3261

If P=0.04P=0.04, which of the following is the best conclusion? If H0H_{0} is false, the probability of obtaining a test statistic as extreme as or more extreme than the one actually observed is 0.04 . The probability that H0H_{0} is true is 0.04 . The probability that H0H_{0} is false is 0.04 . If H0H_{0} is true, the probability of obtaining a test statistic as extreme as or more extreme than the one actually observed is 0.04 .

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Problem 3262

Rewrite as sums or differences of logarithms. logd(x9y4z)logd(x9y4z)=\begin{array}{l} \log _{d}\left(x^{9} y^{4} z\right) \\ \log _{d}\left(x^{9} y^{4} z\right)= \end{array}

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Problem 3263

Factor. 9y2+48y+649 y^{2}+48 y+64

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Problem 3264

Multiply. (5u+4v+2)(2u6)(5 u+4 v+2)(2 u-6)
Simplify your answer. \square

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Problem 3265

E=(6.626×1034 J5)(6.165×1014 Hz)E=\left(6.626 \times 10^{-34} \mathrm{~J} 5\right)\left(6.165 \times 10^{14} \mathrm{~Hz}\right)

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Problem 3266

In a dice game, you begin by rolling three dice. Find the following probabilities. Express your answers as simplified fractions. Part: 0/30 / 3
Part 1 of 3 P(P( All three dice show 4)=)= \square

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Problem 3267

Factor by grouping. 5y36y2+25y305 y^{3}-6 y^{2}+25 y-30

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Problem 3268

3.00×108 m/s1.5×1015 Hz\frac{3.00 \times 10^{8} \mathrm{~m} / \mathrm{s}}{1.5 \times 10^{15} \mathrm{~Hz}}

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Problem 3269

Express (302)13\left(30^{2}\right)^{\frac{1}{3}} in simplest radical form.

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Problem 3270

E=(6.626×1034 s.5)(6.00×1011 Hz)E=\left(6.626 \times 10^{-34} \mathrm{~s} .5\right)\left(6.00 \times 10^{11} \mathrm{~Hz}\right)

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Problem 3271

Rewrite the following without an exponent. (49)1\left(\frac{4}{9}\right)^{-1}

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Problem 3272

For the following, indicate whether a confidence interval for a proportion or mean should be constructed to estimate the variable of interest. Justify your response. Does chewing your food for a longer period of time reduce one's caloric intake of food at dinner? A researcher requires a sample of 75 healthy males to chew their food twice as long as they normal do. The researcher then records the calorie consumption at dinner.
The confidence interval for a mean \square should be constructed because the variable of interest is an individual's reduction in caloric intake, \square which is a \square variable. quantitative qualitative

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Problem 3273

3.00×108 m/s5.20×105 cm\frac{3.00 \times 10^{8} \mathrm{~m} / \mathrm{s}}{5.20 \times 10^{-5} \mathrm{~cm}}

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Problem 3274

Rewrite the complex number 5(cos(π2)+isin(π2))5\left(\cos \left(\frac{\pi}{2}\right)+i \sin \left(\frac{\pi}{2}\right)\right) in a+bia+b i form \square Question Help: Video
Submit Question

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Problem 3275

Express 121212^{\frac{1}{2}} in simplest radical form.

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Problem 3276

18) e3Ln(x+1)=\quad e^{3 \operatorname{Ln}(x+1)}= a) x3+1x^{3}+1 b) x+1x+1 c) 2x+32 x+3 d) (x+1)3(x+1)^{3}

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Problem 3277

Factor. y29y^{2}-9

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Problem 3278

A deck of cards is randomly dealt by the computer during a game of Spider Solitaire. Find the probability (as a reduced fraction) the first card dealt is
Part: 0/30 / 3 \square
Part 1 of 3 (a) An 8 or a heart.
The probability that the first card dealt is an 8 or a heart is \square

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Problem 3279

e) (7+4)2=(-7+4)-2=

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Problem 3280

Express 323532^{\frac{3}{5}} in simplest radical form.

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Problem 3281

What is the significant figure 0234002340

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Problem 3282

COMPLETION 90\%
Find the Highest Common Factor of x=25×55×115y=24×7×11×135\begin{array}{l} x=2^{5} \times 5^{5} \times 11^{5} \\ y=2^{4} \times 7 \times 11 \times 13^{5} \end{array}
Give yourlanswer in index form.

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Problem 3283

Use the properties of logarithms to expand the following expression. logx7y2z3\log \sqrt[3]{x^{7} y^{2} z}
Each logarithm should involve only one variable and should not have any radicals or exponents. You may assume that all variables are positive. logx7y2z3=\log \sqrt[3]{x^{7} y^{2} z}= \square

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Problem 3284

57÷657 \div 6
Quotient: Remainder:

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Problem 3285

1691.2\frac{16}{91.2}

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Problem 3286

Fractions Writing an linproper fraction as a mixed number
Rewrite 318\frac{31}{8} as a mixed number. \square

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Problem 3287

w211w+24w218w+80w215w+50w29w+20\frac{w^{2}-11 w+24}{w^{2}-18 w+80} \cdot \frac{w^{2}-15 w+50}{w^{2}-9 w+20}

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Problem 3288

Find the value of tanG\tan G rounded to the nearest hundredth, if necessary.
Answer Attempt 3 out of 4 tanG=\tan G= \square Submit Answer

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Problem 3289

A top swimmer would be able to swim across a 25-meter pool in about 15\frac{1}{5} of a minute. How fast can a top swimmer go?
Simplify your answer and write it as a proper fraction, mixed number, or whole number. \square meters per minute

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Problem 3290

10yy(3+2x)dxdy\int_{1}^{0} \int_{\sqrt{y}}^{y}(-3+2 x) d x d y

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Problem 3291

My IXL L. 6 Add and subtract fractions with unlike denominators
Add. 27+12=\frac{2}{7}+\frac{1}{2}= \square Submit Im

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Problem 3292

01x2x(3+2x)dydx\int_{0}^{1} \int_{x^{2}}^{x}(-3+2 x) d y d x

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Problem 3293

iple I GCF and LCM | Math with Mr. J
MULTIPLE CHOICE QUESTION
True or False. The GCF is the largest factor that they have the SAME.
Verdadero o falso. EI GCF es el factor más grande que tienen el MISMO.

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Problem 3294

Use a number line to solve.
4. Kim and Tonya are given the same size piece of fabric. Kim uses 13\frac{1}{3} of the piece of fabric. Tonya uses the same amount, but her piece of fabric is divided into 6 smaller squares. What fraction of the fabric did Tonya use?

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Problem 3295

Multiply. 45×40\frac{4}{5} \times 40

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Problem 3296

A tire manufacturer tested 100 randomly selected tires to evaluate the risk involved in its 50,000-kilometer warranty. A tire passed the test if it did not show a defect during a 50,000kilometer simulation. \begin{tabular}{|l|c|} \hline Test result & Tires \\ \hline pass & 85 \\ \hline fail & 15 \\ \hline \end{tabular}
Find a 95%95 \% confidence interval for pp, the proportion of tires that would pass the test. Round your answers to the nearest thousandth. \square <p<<p< \square

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Problem 3297

01xx2(3+2x)dydx\int_{0}^{1} \int_{x}^{x^{2}}(-3+2 x) d y d x

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Problem 3298

Dividing by 1-Digit Numbers Estimate each quotient.
4. 16÷3÷316 \div 3 \div 3
5. 25÷202025 \div \frac{20}{20}
7. 304÷10422304 \div 10422

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Problem 3299

(6250)2(6250)^{2}

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Problem 3300

Ise the distributive property to remove (5z22z5+5)6z3\left(5 z^{2}-2 z^{5}+5\right) 6 z^{3}
Simplify your answer as much as possible

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