Math Statement

Problem 19501

Calculate 5,621÷205,621 \div 20.

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Problem 19502

Simplify (4x2y2)2\left(\frac{-4 x^{2}}{y^{2}}\right)^{2} using exponent properties and show only positive exponents.

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Problem 19503

Find the initial total sales of a spy novel modeled by f(x)=18,245(1.021)xf(x)=18,245(1.021)^{x} when x=0x=0.

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Problem 19504

Simplify the expression: 2(6xy2)0-2(6xy^2)^0 and use only positive exponents in your answer.

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Problem 19505

Simplify the expression 2(3m2n2)1-2\left(3 m^{-2} n^{2}\right)^{-1} using exponent rules and show only positive exponents.

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Problem 19506

Solve 4lg2=(19x)lg44^{\lg 2}=\left(\frac{1}{9 x}\right)^{\lg 4} without a calculator.

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Problem 19507

Find the intensity, II, of an earthquake with a magnitude of 6.7 using R=log(I1)R=\log \left(\frac{I}{1}\right). Round to the nearest whole number.

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Problem 19508

Find the equation of the line parallel to 12x18y=3612 x-18 y=-36 that goes through the point P(3,6)P(-3,-6).

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Problem 19509

Find the total sales of a strategy game on January 1, 2030, using f(x)=10,333(1.046)xf(x)=10,333(1.046)^{x} with x=17x=17.

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Problem 19510

Find the frequency of note A# (1 half step above A3 at 220 Hz) using the formula F(x)=F0(1.059463)xF(x)=F_{0}(1.059463)^{x}. Round to the nearest whole number.

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Problem 19511

Is it true or false that if the product of a point's coordinates is positive, the point is in quadrant I?

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Problem 19512

Find the intensity II of an earthquake with a magnitude of 4.5 using R=log(I1)R=\log \left(\frac{I}{1}\right). Round to the nearest whole number.

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Problem 19513

What was the initial population of a Texas town modeled by f(x)=10,906(1.032)xf(x)=10,906(1.032)^{x} on January 1, 2013?

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Problem 19514

Determine if the polynomial 3x(x2+5x24)(2x+1)3 x(x^{2}+5 x-24)(2 x+1) is in factored, standard, or mixed form.

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Problem 19515

Calculate the product: 0.2×0.8=0.2 \times 0.8=

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Problem 19516

Calculate 7,854÷217,854 \div 21.

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Problem 19517

Determine if the polynomial x+9(x25x+4)x + 9 \cdot (x^{2} \cdot 5x + 4) is in factored, standard, or mixed form.

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Problem 19518

Solve the equations: 2x+13y+1=42^{x+1}-3^{y+1}=4 and 22(x+1)32(y+1)=642^{2(x+1)}-3^{2(y+1)}=64 to three significant figures.

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Problem 19519

Calculate 0.085631×1.320.085631 \times 1.32 and round the result to the correct number of significant figures.

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Problem 19520

Solve: 58÷34\frac{5}{8} \div \frac{3}{4}

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Problem 19521

Solve: 26.04÷6.226.04 \div -6.2

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Problem 19522

Determine the form of the polynomial: (x+2)7x(x+1)3x4(x8)(x+2) 7 x(x+1) 3 x^{4}(x-8) (factored, standard, or mixed).

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Problem 19523

Find the intercepts of the line given by y3=5(x2)y-3=5(x-2). yy-intercept: (,)(\quad, \quad), xx-intercept: (,)(, \quad).

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Problem 19524

Find the intercepts of the line given by y=9x14y=-9x-14. xx-intercept: (,)(\quad, \quad), yy-intercept:

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Problem 19525

Find tan(θ)\tan (\theta) given sin(θ)<0\sin (\theta)<0 and sec(θ)=354\sec (\theta)=\frac{\sqrt{35}}{4}. Provide the exact answer.

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Problem 19526

Solve cos(x2)=32\cos \left(\frac{x}{2}\right)=-\frac{\sqrt{3}}{2} for xx in [0,2π)[0,2\pi). Provide exact radian solutions.

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Problem 19527

Check if the following expressions are equivalent by rewriting them: 1) 7n(3n+1)7 n(3 n+1) 2) x225x^{2}-25 3) (4w+2)2(4 w+2)^{2}

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Problem 19528

Simplify: 46727÷3=4|6-7|-27 \div 3 =

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Problem 19529

Simplify the expression: 42(7)+22|-4-2|(-7)+2^{2}. What is the result?

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Problem 19530

Find the inverse function f1f^{-1} of f(x)=(x4+4)1f(x)=\left(x^{4}+4\right)^{-1} for x(,0]x \in (-\infty, 0].

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Problem 19531

Simplify the expression: 922+3(79)=9 - 2^{2} + 3 - (7 - 9) = (Provide your answer.)

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Problem 19532

Solve cos(x2)=12\cos \left(\frac{x}{2}\right)=\frac{1}{2} for xx in [0,2π)[0,2 \pi), and give the answer in exact radians.

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Problem 19533

Find the set of numbers that are both rational and irrational. Choose the correct set: A. \varnothing B. {0}\{0\} C. {x,x}\{\sqrt{x}, \sqrt{-x}\} D. {0,1,2,3,4,5,}\{0,1,2,3,4,5, \ldots\}

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Problem 19534

Factor the expression: 14ab2a+21b314ab - 2a + 21b - 3 into the form (?a+[])(?b[])(?a + [])(?b - []).

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Problem 19535

Is the function f(x)f(x), defined as f(x)=lnx+413+xf(x)=\ln \frac{\sqrt{x+4}-1}{3+x} for x3x \neq -3 and f(3)=2f(-3)=2, continuous at x=3x=-3?

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Problem 19536

Is the function f(x)=x24f(x) = \sqrt{x^{2}-4} continuous at x=0x=0?

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Problem 19537

Find the axis of symmetry for f(x)=x2+3x+6f(x)=x^{2}+3x+6 using x=b2ax=\frac{-b}{2a}. What is x=[?][][]x=[?] \frac{[]}{[]}?

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Problem 19538

Which graph has the narrowest parabola: y=2x2+x+3y=-2x^{2}+x+3 or f(x)=4x230xf(x)=-4x^{2}-30x?

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Problem 19539

Check if the function f(x)={ex/(x+1)if x1e1if x=1f(x)=\begin{cases} e^{x /(x+1)} & \text{if } x \neq-1 \\ e^{-1} & \text{if } x=-1 \end{cases} is continuous at x=1x=-1.

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Problem 19540

Is the piecewise function f(x)={x2if x33if x<3f(x)=\begin{cases} \sqrt{x^{2}} & \text{if } x \geqslant-3 \\ -3 & \text{if } x<-3 \end{cases} continuous at x=3x=-3?

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Problem 19541

Is the function f(x)=1x+1f(x)=\frac{1}{x+1} continuous at x=cx=c for c=1c=1?

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Problem 19542

Is the function f(x)={sinxx if x01 if x=0f(x)=\left\{\begin{array}{ll}\frac{\sin x}{x} & \text { if } x \neq 0 \\ 1 & \text { if } x=0\end{array}\right. continuous at x=0x=0?

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Problem 19543

Convert 0.0001dg0.0001 \mathrm{dg} to pg\mathrm{pg}.

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Problem 19544

Convert 9.87×1030ml9.87 \times 10^{-30} \mathrm{ml} to Tl\mathrm{Tl}.

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Problem 19545

Find the inverse function f1f^{-1} for f(x)=(x8+1)1,(,0]f(x)=\left(x^{8}+1\right)^{-1}, \quad(-\infty, 0].

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Problem 19546

Is the function f(x)f(x) continuous at x=1x=-1, where f(x)=x+2f(x)=|x+2| if x1x \neq -1 and f(1)=1f(-1)=-1?

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Problem 19547

Is the function f(x)=tan(2πx)f(x)=\tan \left(\frac{2}{\pi} x\right) continuous at x=cx=c, where c=π2c=\frac{\pi}{2}?

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Problem 19548

Is the function f(x)={1lnxπ/2 if x>eπ0 if xeπf(x)=\left\{\begin{array}{ll}\frac{1}{\ln \sqrt{x}-\pi / 2} & \text { if } x>e^{\pi} \\ 0 & \text { if } x \leqslant e^{\pi}\end{array}\right. continuous at x=eπx=e^{\pi}?

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Problem 19549

Find the value of f(x)=5sin1(sin(x))+3cos1(sin(4x))f(x)=5 \sin^{-1}(\sin(x)) + 3 \cos^{-1}(\sin(4x)) at x=π3x=\frac{\pi}{3}.

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Problem 19550

Find the value of sin1[sin(7π6)]\sin ^{-1}\left[\sin \left(-\frac{7 \pi}{6}\right)\right] without a calculator.

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Problem 19551

Simplify cot(sin1(x))\cot \left(\sin ^{-1}(x)\right) using a triangle or trigonometric identity, assuming x>0x > 0.

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Problem 19552

Find the value of the trigonometric expression: tan[sec1(5)]\tan \left[\sec ^{-1}(-5)\right].

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Problem 19553

Check if the function f(x)f(x) is continuous at x=0x=0, where f(x)={arctan1xif x>0x+π2if x0f(x)=\begin{cases}\arctan \frac{1}{x} & \text{if } x>0 \\ x+\frac{\pi}{2} & \text{if } x \leq 0\end{cases}.

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Problem 19554

Convert 0.0001dg0.0001 \mathrm{dg} to picograms (pg) using the SI unit conversion method.

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Problem 19555

Is the function f(x)=elnxf(x)=e^{\ln x} continuous at x=0x=0?

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Problem 19556

Find the value of cos(cot1(10))\cos \left(\cot ^{-1}(10)\right) using trigonometric identities.

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Problem 19557

Is the piecewise function f(x)={2xif x22xif x<2f(x)=\left\{\begin{array}{ll} 2|x| & \text{if } x \geqslant -2 \\ 2x & \text{if } x < -2 \end{array}\right. continuous at x=cx=c, where c=2c=-2?

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Problem 19558

Find the largest domain for which f(x)=9xf(x)=9-x is one-to-one, then provide the inverse function for that domain. Use interval notation.

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Problem 19559

Is the function f(x)={sin2x+cos2x if x>11 if x1f(x)=\left\{\begin{array}{ll}\sqrt{\sin ^{2} x+\cos ^{2} x} & \text { if } x>1 \\ 1 & \text { if } x \leqslant 1\end{array}\right. continuous at x=1x=1?

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Problem 19560

Is the function f(x)={x+42x if x>0x0.25 if x0f(x)=\left\{\begin{array}{ll}\frac{\sqrt{x+4}-2}{x} & \text { if } x>0 \\ x-0.25 & \text { if } x \leqslant 0\end{array}\right. continuous at x=cx = c? Explain.

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Problem 19561

Check if the function f(x)={x+42xif x>0x0.25if x0f(x)=\begin{cases} \frac{\sqrt{x+4}-2}{x} & \text{if } x > 0 \\ x-0.25 & \text{if } x \leq 0 \end{cases} is continuous at x=0x=0.

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Problem 19562

Find the value of cc for the piecewise function f(x)={2x+c,x1;x2+3,x>1}f(x)=\{2x+c, x \leq 1; x^2+3, x>1\} to be continuous.

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Problem 19563

Solve for a×da \times d given a+4a4=b+5b5=c+7c7=d+9d9\frac{a+4}{a-4}=\frac{b+5}{b-5}=\frac{c+7}{c-7}=\frac{d+9}{d-9} and a+b+c+d=125a+b+c+d=125.

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Problem 19564

Resuelve: a+4a4=b+5b5=c+7c7=d+9d9\frac{a+4}{a-4}=\frac{b+5}{b-5}=\frac{c+7}{c-7}=\frac{d+9}{d-9} y a+b+c+d=125a+b+c+d=125; halla el «axd».

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Problem 19565

Solve for yy in the equation 3y+73=4333y + \frac{7}{3} = \frac{43}{3}.

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Problem 19566

Simplify the expression (aβ3)(a2β4)5\left(a \beta^{3}\right)\left(a^{-2} \beta^{4}\right)^{5}.

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Problem 19567

Solve for xx in the equation: 18=6×x18 = 6 \times x. What is xx?

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Problem 19568

Solve the equations: T425=T-4-25=, 3712=37-12=, 1718=17-18=, 102=10-2=, 11+4=-11+4=, 3020=-30-20=, 1+8=-1+8=.

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Problem 19569

Solve for kk in the equation: 10k+1=407k-10 k + 1 = 40 - 7 k.

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Problem 19570

Solve for aa in the equation: 167(2a+3)=232a-16-7(2 a+3)=23-2 a.

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Problem 19571

Solve the equation 2(4w1)=10(w3)+42(4w - 1) = -10(w - 3) + 4.

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Problem 19572

Solve the equation: 5x(x18)=62(x+15)5x - (x - 18) = 6 - 2(x + 15).

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Problem 19573

Solve the equation 8(y+4)2(y1)=703y8(y+4)-2(y-1)=70-3y.

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Problem 19574

Solve the equation: 8(5x3)=6(3x4)8(5x - 3) = 6(-3x - 4).

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Problem 19575

Solve the equation: 3(2x+2)3x=6+3x3(2x + 2) - 3x = 6 + 3x.

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Problem 19576

Solve the equation: 6(2x6)=7(2x+4)6(2 x-6)=-7(-2 x+4).

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Problem 19577

Solve for hh in the equation: 11h(2h1)=11811 h - (2 h - 1) = 118.

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Problem 19578

Solve the equation: 3x13=7(x+2)4(x7)3x - 13 = 7(x + 2) - 4(x - 7).

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Problem 19579

Find the inverse of the function f(x)=3(4x1)1/3f(x)=3(4 x-1)^{1/3}.

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Problem 19580

Solve for xx in the equation 25=12(10x2)+3x-25=\frac{1}{2}(10 x-2)+3 x.

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Problem 19581

Solve the equation x2+8x+5=0x^{2}+8x+5=0 by completing the square.

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Problem 19582

Solve the equation x2+7x3=0x^{2}+7x-3=0.

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Problem 19583

Solve the following by completing the square: (a) x2+8x+5=0x^{2}+8x+5=0, (c) x211x7=0x^{2}-11x-7=0.

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Problem 19584

Solve the equation x211x7=0x^{2}-11 x-7=0.

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Problem 19585

Solve the equation x2+1.2x=1x^{2}+1.2 x=1.

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Problem 19586

Calculate 10×1010 \times 10 using the equation: C×10+×10=10×10C \times 10 + - \times 10 = 10 \times 10. What is 10×1010 \times 10?

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Problem 19587

Is g(x)=2x55g(x)=\frac{2-x^{5}}{5} a polynomial? Choose A (degree), B (not nonnegative integer), or C (ratio of polynomials).

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Problem 19588

Determine if f(x)=5x+x2f(x)=5x+x^{2} is a polynomial. Choose: A. Not a polynomial, B. Polynomial of degree, C. No constant term.

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Problem 19589

Determine if g(x)=2x55g(x)=\frac{2-x^{5}}{5} is a polynomial. Choose A, B, or C and complete if needed.

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Problem 19590

Determine if f(x)=96x3f(x)=9-\frac{6}{x^{3}} is a polynomial. Choose A (not a polynomial) or B (is a polynomial) and explain.

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Problem 19591

Determine if f(x)=96x3f(x)=9-\frac{6}{x^{3}} is a polynomial. If yes, state the degree; if no, explain why.

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Problem 19592

Find the value of OΔΔOΔO \Delta \Delta O \Delta given the equations: 00000=000000=0, 0000Δ=100000 \Delta=10, 000ΔO=20000 \Delta O=20, 000ΔΔ=30000 \Delta \Delta=30, 00ΔOΔ=5000 \Delta O \Delta=50, 00ΔΔO=6000 \Delta \Delta O=60.

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Problem 19593

ก. แก้สมการ 2x+3=122 x+3=12 ฝ. แก้สมการ 2x3=112 x-3=11

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Problem 19594

Find the value of 323^{-2}. A. 19\frac{1}{9} B. -6 C. 19-\frac{1}{9} D. -9

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Problem 19595

Calculate 60÷2(3+7)60 \div 2(3+7).

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Problem 19596

Simplify 23272^{3} \cdot 2^{7}. Options: A. 2212^{21} B. 292^{9} C. 242^{-4} D. 2102^{10}

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Problem 19597

Evaluate 7375-7^{-3} \cdot 7^{5}. Choose the correct answer: A. 149-\frac{1}{49} B. 49 C. 149\frac{1}{49} D. -49

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Problem 19598

Simplify 12212312^{2} \cdot 12^{3}. Options: A. 12512^{5} B. 12612^{6} C. 1445144^{5} D. 24524^{5}

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Problem 19599

Solve for xx in the equation: 1x2=152+172\frac{1}{x^{2}}=\frac{1}{5^{2}}+\frac{1}{7^{2}}.

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Problem 19600

Solve the equation 4x5y=204x - 5y = 20 for yy in terms of xx.

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