integrating factor and the ED solution y (12 + 8x + 6y ^ 2) dx +
x (16 + 8x + 12y ^ 2) dy = 0
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Indicate the option that contains the general solution to: (-4 +
6x + 2y) dx + (1 + 2x + 8y) dy = 0
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y+xy`=cos(x)
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Using the integrating factor method, solve and select the option
that contains the general solution to the DE: (1 + x ^ 2y) dy =...
FIND THE GENERAL SOLUTION TO THE DE: Y”’ + 4Y” – Y’ –
4Y = 0
COMPUTE:
L {7 e 3t – 5 cos ( 2t ) – 4 t 2
}
COMPUTE:
L – 1 {(3s + 6 ) / [ s ( s 2 + s – 6 ) ]
}
SOLVE THE INITIAL VALUE PROBLEM USING LAPLACE
TRANSFORMS:
Y” + 6Y’ + 5Y = 12 e t
WHEN : f ( 0 ) = -...
1. Find p and graph the parabola y+12x−2x^2=16
2. Find e, d and determine which conic that has the equation r=
4 / 5 - 4sin(theta)
Please show steps. Thanks a lot.
1) find the solution t the non-homogenous DE
y''-16y=3e5x , y(0)=1 , y'(0)=2
2)find the solution to the DE using cauchy-euler method
x2y''+7xy'+9y=0 , y(1)=2 , y'(1)=3
3)find the solution to the DE using Laplace
y''+8y'+16y=0 , y(0)=-1 , y'(0)=8
solve non-homogeneous de y" + y = sec^2x by finding-
the solution yh(x) to the equivalent homogeneous de
the particular solution yp(x) using variation of
parametrs
the general solution y(x) = yh(x) + yp(x) of the de
please explain the steps