Suppose a curve is defined by the equation 16(x² + y²) = 45. Show that if you translate the curve to the right by units and down by units,then the new curve satisfies the equationO a. 8x2 + 8y² – 12x + 24y = 0O b. 8x +8y² – 12x – 24y = 0O c. 8x - 8y²-12x+24y = 0O d. 8x2 + 8y?+ 12x + 24y = 0MocBook AirSOescc&568.12€3 #4YQEGHJKASDCVBoptioncommandoptioncommand>

Given that a curve is defined by the equation 16x2+y2=45

Answered: Suppose a curve is defined by the…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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Suppose a curve is defined by the equation 16(x2 + y) = 45. Show that if you translate 3 3 the curve to the right by units and down by 4 units, then the new curve satisfies the equation Оа. 8х? + 8у? + 12х + 24у —D0 O b. 8x² + 8y² – 12x + 24y = 0 Ос. 8х? — 8у? — 12х + 24у %3D 0 o d. 8x² + 8y² – 12x – 24y = 0 O C. 12x + 24y = 0 - Clear my choice
B. Find the slope of the curve at the given point. 16. y = 2x²-3x+1 at (2, 3) 17. y=3x²-2x+1 at (-1, 6) 18. y=x²-3x+4 at (2, 2) 19. y = x² + 2x-3 at (-2, -3) 20 y = 3x² + 4x-2 at (-1, -3
5. Find the equation of the line through the point (1,3) with a slope of 2 in both point- slope form and slope-intercept form. Sketch a graph of the function.
5. Find the equation of the line perpendicular to y – 7 = (x + 5) that passes through the point (1,8). Write the equation in slope-intercept form.
Which of the following is a parameterisation of the straight line passing through the points (7,0) and (2, -3 a) where a is a real number? Ox=7-5t, y=-3at. Ox=2-7t, y=5t-3a. Ox=7-7t, y = (-3a-2) t. Ox=5t, y=3at+2. Ox=(-3a-2) t+2, y=-7t-3 a.
Find the equation of the tangent and normal line to the following curves at a given specified point. Write the equation in slope-intercept and general equation form. Graph the curve, the tangent line, the normal line and the point of intersection of the lines and the curve.
Find y if the line through (3,2) and (−6,y) has a slope m=−5/9

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Suppose a curve is defined by the equation 16(x + y) = 45. Show that if you translate the curve to the right by units and down by units, then the new curve satisfies the equation a. 8x +8y-12x +24y = 0 O b. 8x? +8y- 12x-24y 0 O. 8x? - 8y - 12x+24y 0 d. 8x+8y+12x+24y = 0