find the value
of integration of
6&0 ydx
Answers
Answer:
What is the value of integral (ydx +xdy)?
By variable separation method
log a+log b=log ab
Hope you understand this.
Comments are welcome :-)
∫(ydx+xdy)
Let t=xy
dt=xdy+ydx
∫dt
t+C
xy+C
∫(ydx+xdy)=xy+C
I=integ.of. (y.dx+x.dy)
Let. p=x.y……………………...(1)
dp =y.dx+x.dy……………….….(2)
We know that.
Integral of dp =p. + C
On putting dp=y.dx+x.dy from eq.(2) and p=x.y. from eq.(1).
Integral of (y.dx+x.dy) = x.y. + C. Answer.
What is the integration of xdy+ydx=0?
How can you find the value of the integration of “ydx”?
How is (ydx-xdy) /y^2 = d(x/y)?
ydx+xdy=d(xy)
∫ydx+xdy=∫d(xy)
=xy+C
What is the integration of xdy+ydx=0?
How can you find the value of the integration of “ydx”?
How is (ydx-xdy) /y^2 = d(x/y)?
What is the value of ∫ (xdy+ydx) where integration is closed curve?
How do you solve xdx + ydy = xy (xdy − ydx)?
What is the equation of the tangent to the curve [y = x^3 + 6(x) ^2 - 34x + 44] at the point where the curve crosses the y-axis? What are the coordinates of the point where the tangent meets the curve again?
How do I solve the exact differential equations, ydx + xdy = 0?
What is the solution to ydx-xdy+log xdx=0 in the integrating factors method?
What is the integration of xdy+ydx=0?
How can you find the value of the integration of “ydx”?
How is (ydx-xdy) /y^2 = d(x/y)?
What is the value of ∫ (xdy+ydx) where integration is closed curve?
How do you solve xdx + ydy = xy (xdy − ydx)?
What is the equation of the tangent to the curve [y = x^3 + 6(x) ^2 - 34x + 44] at the point where the curve crosses the y-axis? What are the coordinates of the point where the tangent meets the curve again?
How do I solve the exact differential equations, ydx + xdy = 0?
What is the solution to ydx-xdy+log xdx=0 in the integrating factors method?
What is the general solution of xdy+ydx=0?
What is the integration of (logx) ².dx?
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