Textile Engineering > GATE 2009 > Partial Differential Equations
The partial differential equation
(∂2u/∂x2) + (1/x)(∂u/∂x) + (1/x2)(∂2u/∂θ2) = 0 is known as the polar form of
(∂2u/∂x2) + (1/x)(∂u/∂x) + (1/x2)(∂2u/∂θ2) = 0 is known as the polar form of
Correct : a
Similar Questions
Suppose u(x,t)=1/2[g(x+ct)+g(x-ct)] is a solution of the following initial value problem of the wave equation
Then the value of c2, is
The partial differential equation Uxx + Uyy = 0 is of type______.
Consider the partial differential equation &partial;2u/&partial;x2 = (1/k)&partial;u/&partial;t + sin x, k>0.Amongst the following, the correct statement(s) for...
Total Unique Visitors
Loading......