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Hi Mathsyperson!
Thanks for answering me!
I know that the answer is e^((-9/2)x) (Acos(3√7/2)x) + Bsin(3√7/2)x)
How can I solve this:
y + 9y' + 36y= 0
λ^2 + 9λ + 36= 0 → λ= ?
Matilde
y´ + (3x/(x^2 + 4))y = x/(x^2 + 4)
Int. Factor is: e^[int_(3x/(x^2 + 4))]
= e^[(3/2)*ln(x^2 + 4)] = e^[ln((x^2 + 4)^(3/2))] = (x^2 + 4)^(3/2).
(x^2 + 4)^(3/2)y´+ 3x(x^2 + 4)^(1/2) = x(x^2 + 4)^(1/2)
[(x^2 + 4)^(3/2)y]´ = x(x^2 + 4)^(1/2)
(x^2 + 4)^(3/2)y
= int_[x(x^2 + 4)^(1/2) dx] (u=x^2 + 4)
= int_[u^(1/2)/2]
= (u^(3/2)/3) + C
= ((x^2 + 4)^(3/2)/3) + C (3)
y = (1/3) + C(x^2 + 4)^(-3/2).
y(0)=1 --> = (1/3) + C*(4)^(-3/2) = (1/3) + (C/8), C=8*(1 - (1/3)) = 8*2/3 = 16/3.
y = [16(x^2 + 4)^(-3/2) + 1]/3.
Thanx mathsyperson!
Can anyone see if this is right?
x * y - x^4 * cosx = 3y, y(2pi)= 0
x * y 3y = x^4 cosx | :x
y (3/x) *y = x^3 * cosx
f(x) = -3/x --> F(x) = ∫ -3/x * dx = -3ln|x| + C
the integration factor is: e^F(x) = e^-3ln|x| = 1/e^3ln|x| = 1/x^3
y (3/x) *y = x^3 * cosx | * 1/x^3
y * 1/x^3 3/x^4 * y = cosx
∫ (y * 1/x^3) = ∫ cosx
y * 1/x^3 = sinx + C | :1/x^3)
y(x) = x^3 * sinx + C * x^3
y(2pi) = (2pi)^3 * sin*2pi + C * (2pi)^3 = 0
y(x)= x^3 * sinx
Can somone please help me with this one:
(x^2 + 4)y + 3xy = x ; y(0)=1
I started like this
y(3x/x^2+4)*y= x/x^2+4
f(x)=3x/x^2+4 --> F(x) ∫ (3x/x^2+4 )dx= and now?
Integration factor is?
Matilde
I know Im late.. but ThankYouVeryMuch!
Thanx kylekatarn!
I have to solve:
Volume= ∫ π (e^2x * (sinx)^2 * dx ,0 ,π
I know that the integral of e^2x = 1/2 e^2x.... but I don't know what to do with (sinx)^2?
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