y=x^(x^(x^(2)))quad " then prove that "(...

y=x^(x^(x^(2)))quad " then prove that "(dy)/(dx)=(y^(2))/(x(1-y log x))

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

If y=x^(x^(x^(...oo))) , then prove that, (dy)/(dx)=(y^(2))/(x(1-y log x)) .

If y=a^(x^(x^(2)*oo)), prove that (dy)/(dx)=(y^(2)log y)/(x(1-y log x*log y))

If y = x^y , prove that (dy)/(dx) = (y^2)/(x(1 - y log x))

If y=a^x^a^x^...^(((((oo))))) , then prove that (dy)/(dx)=(y^2(log)_e y)/(x(1-y(log)_e x(log)_e y)

If y=a^x^a^x^...^(((((oo))))) , then prove that (dy)/(dx)=(y^2(log)_e y)/(x(1-y(log)_e x(log)_e y)

If y=a^x^a^x^...^(((((oo))))) , then prove that (dy)/(dx)=(y^2(log)_e y)/(x(1-y(log)_e x(log)_e y)

If y=a^(x^(a^x..oo)) then prove that dy/dx=(y^2 log y )/(x(1-y log x log y))

If y=a^(x^(a^x..oo)) then prove that dy/dx=(y^2 log y )/(x(1-y log x log y))

If y=a^(x^(a^x..oo)) then prove that dy/dx=(y^2 log y )/(x(1-y log x log y))

If y=sqrt(x)^(sqrt(x)^(sqrtx...oo)) then prove that dy/dx=(y^2)/(x(2-y log x )).

Recommended Questions

y=x^(x^(x^(2)))quad " then prove that "(dy)/(dx)=(y^(2))/(x(1-y log x)...
Text Solution
|
The solution of the differential equation (dy)/(dx)=(x+y)/x satisfy...
Text Solution
|
If y=a^x^a^x^(dot)dot^((((oo)))),p rov et h a t(dy)/(dx)=(y^2logy)/(x...
Text Solution
|
If x^y=e^(x-y), Prove that (dy)/(dx)=(logx)/((1+logx)^2)
Text Solution
|
If x^y=e^(x-y), prove that (dy)/(dx)=(logx)/(1+logx)^2
Text Solution
|
If x^y=e^(x-y) , prove that (dy)/(dx)=(logx)/((1+logx)^2)
Text Solution
|
If y log x=x-y prove that (dy)/(dx)=(log x)/((1+log x)^(2))
Text Solution
|
"If "x^(y)=e^(x-y)," prove that "(dy)/(dx)=(log x)/((1+log x)^(2)).
Text Solution
|
If y=a^(x^(a^x..oo)) then prove that dy/dx=(y^2 log y )/(x(1-y log x l...
Text Solution
|