Equation

Problem 18601

14) A DRYER OF RADIUS 12 ENCHES IS SPENGIING AT A RATE OF 240 REVOUTLIONS PER MINUTE. FIN) THE LENEAR VELOCETY OF A SOCK IN THFS DRYER IN FEET PER SEC OND.

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Problem 18602

Solve the equation by subtracting the appropriate number from both sides and enter the value of xx below. x+27=91x=\begin{array}{l} x+27=91 \\ x= \end{array} \qquad
Answer here

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Problem 18603

Find the intercepts of the line given by x2y=4x - 2y = 4 and use them to graph the line.

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Problem 18604

Daria spent $47.50\$ 47.50 on alpaca yarn, $32.14\$ 32.14 on angora, $16.50\$ 16.50 on wool, and $3.86\$ 3.86 on needles. Total?

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Problem 18605

Show the commutative property of multiplication: complete qc=q \cdot c = with cqc \cdot q.

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Problem 18606

Find the xx-intercept and yy-intercept of the line given by 8x+10y=20-8x + 10y = -20 and graph it.

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Problem 18607

Identify the property shown: 7(y+2)=7y+147(y+2)=7y+14. Options: A. associative, B. distributive, C. commutative, D. associative.

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Problem 18608

Solve for bb in the equation b5=11\frac{b}{-5}=11.

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Problem 18609

Complete the equation using the distributive property: 2(x+y+7)=2(x+y+7)=

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Problem 18610

Identify the property shown: p(rq)=(pr)qp \cdot(r \cdot q)=(p \cdot r) \cdot q. Choose A, B, C, or D.

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Problem 18611

Complete the equation to show the distributive property: 2(x+y+7)=2(x+y+7)=

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Problem 18612

A car bought for \$38,000 is worth \$2,600 after 6 years. What was its value at the end of year 3?

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Problem 18613

Solve for nn in the equation 18n+12=27n+318 n + 12 = 27 n + 3.

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Problem 18614

Identify the property shown: 2c1=2c2c \cdot 1 = 2c. Choose from: commutative, distributive, identity, inverse, or associative property.

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Problem 18615

Find the xx-intercept and yy-intercept of the line 2x+4y=82x + 4y = -8 and use them to graph the line.

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Problem 18616

Complete the equation to show the identity property of multiplication: (56k)(1)= \left(\frac{5}{6} k\right)(1)=\square

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Problem 18617

Find the angles: mCDF=(3x+14)m \angle C D F=(3x+14)^\circ, mFDE=(5x2)m \angle F D E=(5x-2)^\circ, mCDE=(10x18)m \angle C D E=(10x-18)^\circ.

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Problem 18618

Find the angles: mCDF=(3x+14)m \angle C D F = (3x + 14)^\circ, mFDE=(5x2)m \angle F D E = (5x - 2)^\circ, mCDE=(10x18)m \angle C D E = (10x - 18)^\circ. Solve for xx and each angle. Also, find mLMPm \angle L M P if it's 11 degrees more than mNMPm \angle N M P and mNML=137m \angle N M L = 137^\circ.

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Problem 18619

Graph the line with slope 2/52/5 and yy-intercept -5.

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Problem 18620

Determine the slope and yy-intercept of the line given by the equation 6xy=1-6x - y = -1.

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Problem 18621

Find the yy-intercept and slope of the line 6xy=1-6x - y = -1. Provide answers in simplest form.

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Problem 18622

Graph the line with slope 25\frac{2}{5} and yy-intercept -5.

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Problem 18623

Find the line equation in slope-intercept form with yy-intercept -7 and slope 13-\frac{1}{3}.

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Problem 18624

Solve for xx in the equation 4(xb)=x4(x-b)=x.

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Problem 18625

Is the Hotel Capitale's weekly rate of 85,010 RP mid-range compared to \125to$175?Use125 to \$175? Use 1 \mathrm{RP}=\0.0147 0.0147 to calculate.

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Problem 18626

Identify the property shown: 20c1=20c20c \cdot 1 = 20c. Options: inverse, commutative, associative, distributive, identity.

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Problem 18627

Graph the line with a yy-intercept of -7 and a slope of 13-\frac{1}{3}.

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Problem 18628

Identify the property shown in: 5(z+4)=5z+20 5(z+4)=5z+20 . Options: A. distributive, B. associative addition, C. associative multiplication, D. commutative multiplication.

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Problem 18629

Identify the property shown by 3z13z=13 z \cdot \frac{1}{3 z}=1. Choose from: A. inverse multiplication B. identity multiplication C. identity addition D. inverse addition.

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Problem 18630

Find the equation of the line given that it passes through (6, 0). Use y=3x+by=3x+b to find bb.

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Problem 18631

A glacier advanced 3.2 inches in 116 minutes. How many feet will it advance in one year? Round to the nearest hundred.

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Problem 18632

Graph the line with slope -3 and y-intercept -2.

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Problem 18633

Complete the equation using the distributive property: 7(x+y+3)= 7(x+y+3)= 7(x+y+3)=7x+7y+21 7(x+y+3)=7x+7y+21

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Problem 18634

Find the equation of the line through (6,5)(-6,5) that is parallel to 2x+3y=4-2x + 3y = 4.

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Problem 18635

Find the elevation difference between a mountain at 16,933 feet and a valley at 36-\frac{3}{6} feet.

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Problem 18636

Find the standard form equation of the line through points (0,6)(0,6) and (4,0)(4,0).

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Problem 18637

Find the radius of a circle with circumference 22 m22 \mathrm{~m}. Round to the nearest tenth if needed.

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Problem 18638

Find the equation of the horizontal line that goes through the point (3,1)(3,-1).

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Problem 18639

Rewrite the equation in standard form: y+1=23(x+3)y + 1 = \frac{2}{3}(x + 3)

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Problem 18640

Complete the equation to show the identity property of multiplication: (56n)(1)=\left(\frac{5}{6} n\right)(1)=\square

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Problem 18641

Graph the line with y-intercept 1 and slope 4.

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Problem 18642

Graph the line with a yy-intercept of -3 and a slope of 14\frac{1}{4}.

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Problem 18643

Find the height of a triangular park with a base of 200yd200 \mathrm{yd} and an area of 7500yd27500 \mathrm{yd}^{2}.

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Problem 18644

Find the volume in liters of 3.02 kg of a liquid with a density of 1.17 g/cm31.17 \mathrm{~g} / \mathrm{cm}^{3}.

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Problem 18645

Calculate the product: (3.5×108)(5×103)=(3.5 \times 10^{8}) \cdot (5 \times 10^{-3}) =

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Problem 18646

Graph the line with slope 34-\frac{3}{4} and yy-intercept at -2.

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Problem 18647

A vehicle travels at 65mi/h65 \mathrm{mi/h}. How long to cover 25mi25 \mathrm{mi}?

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Problem 18648

Calculate the wavelength for a hydrogen atom transition from (n=2)(n=2) to (n=4)(n=4) using λ=hcΔE\lambda=\frac{h c}{\Delta E}. What color is it?

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Problem 18649

Solve the equation 9x=2x39 - x = 2x - 3 and match the solution to the correct description.

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Problem 18650

A will divides 12\frac{1}{2} of the estate among relatives. 15\frac{1}{5} of the remaining goes to charity A. Find the fraction for charity A.

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Problem 18651

Graph the equation y=3x+5y=3x+5 and find the graph that matches y=11y=11. Solve the equation 3x+5=113x+5=11.

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Problem 18652

Adjust the brownie recipe for 12 servings from 16. Calculate the new amounts for each ingredient.

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Problem 18653

Select the graph for y=3x+5y=3 x+5 and y=11y=11. Solve 3x+5=113 x+5=11 to find x=x=\square.

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Problem 18654

Find the limit: limxx+14x2+2\lim _{x \rightarrow \infty} \frac{x+1}{\sqrt{4 x^{2}+2}}.

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Problem 18655

Graph the line with a y-intercept of -8 and a slope of 8.

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Problem 18656

Determine the ingredient amounts for 12 brownies based on a recipe for 16 brownies.

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Problem 18657

Find the slope of a line perpendicular and a line parallel to y=25x+8y=-\frac{2}{5} x+8.

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Problem 18658

Find the slope of a line parallel and a line perpendicular to y=3x7y=3x-7.

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Problem 18659

Find the slope of a line perpendicular and parallel to y=12xy=\frac{1}{2} x.

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Problem 18660

Find the equation of the line that goes through the point (10,3)(10,3) with a slope of 32-\frac{3}{2}.

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Problem 18661

16x425x=0211801116 x^{4}-25 x=021-18011

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Problem 18662

9. Find the equation of a line perpendicular to the line x2y3=0x-2 y-3=0 and passing through the point (1,2)(1,-2)

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Problem 18663

Find dy/dxd y / d x by implicit differentiation x3y5+3x=8y3+1x^{3} y^{5}+3 x=8 y^{3}+1

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Problem 18664

Find the slope-intercept form of a line that passes through (5,3)(5,-3) with a slope of -4.

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Problem 18665

Find the slope-intercept form of the line through (1,2)(-1,2) with slope 5.

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Problem 18666

Find the equation in point-slope form for a line through (3,2)(-3,-2) with a slope of 5.

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Problem 18667

Find the equation in point-slope form for the line through (10,4)(-10,4) with a slope of 12\frac{1}{2}.

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Problem 18668

Amy's bike tires have a radius of 28 cm28 \mathrm{~cm}. After 1,250 revolutions, how far has she traveled in km\mathrm{km}? Use 227\frac{22}{7} for π\pi.

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Problem 18669

Find the equation in point-slope form for a line through (4,4)(4,4) with slope 52-\frac{5}{2}.

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Problem 18670

Divide using repeated subtraction and standard algorithm: a. 508÷15508 \div 15 b. 659÷24659 \div 24 c. 1024÷991024 \div 99

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Problem 18671

A ball is thrown down at 38ft/s38 \mathrm{ft/s} from a 63 ft building. Find the time it is in the air using s(t)=16t238t+63s(t)=-16 t^{2}-38 t+63.

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Problem 18672

Determine the slope and yy-intercept of the line given by the equation 6x2y=36x - 2y = 3.

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