PART I. Re-arranging Into A Standard FormRe-arrange the equation so that it is in form 1, if possible. If it is not possible to put it in form 1, then put it inform 2.Form 1:Form 2:dyv(y)dy = w(x)dxdx+ p(x)y = f(x)The symbols a, b and c are nonzero constants. Your final answer must have like terms combined and fractionsreduced. Also, your final answer is to have as few exponents as possible (an exponent that has more than one termis still a single exponent. For example, x³x²bx=a, which has 3 exponents, should be re-expressed as x3+2b-a,which now has only 1 exponent).5)Зхуdy %3D ху'dy — yӑx + 3ӑх

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Answered: 5) Зхуdy %3D ху?dy — ydx + 3dx

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5) Зхуdy %3D ху?dy — ydx + 3dx

Algebra for College Students

10th Edition

ISBN:9781285195780

Author:Jerome E. Kaufmann, Karen L. Schwitters

Publisher:Jerome E. Kaufmann, Karen L. Schwitters

Chapter13: Conic Sections

Section13.1: Circles

Problem 48PS

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Question

PART I. Re-arranging Into A Standard Form
Re-arrange the equation so that it is in form 1, if possible. If it is not possible to put it in form 1, then put it in
form 2.
Form 1:
Form 2:
dy
v(y)dy = w(x)dx
dx
+ p(x)y = f(x)
The symbols a, b and c are nonzero constants. Your final answer must have like terms combined and fractions
reduced. Also, your final answer is to have as few exponents as possible (an exponent that has more than one term
is still a single exponent. For example, x³x²bx=a, which has 3 exponents, should be re-expressed as x3+2b-a,
which now has only 1 exponent).
5)
Зхуdy %3D ху'dy — yӑx + 3ӑх

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