Solve f

Transcribed Image Text:

a) Find the Laplace transformation of the function f(t) = cosh at sinh bt b) Find 2f where f = e2x sin2y. c) Write the sufficient condition for existence of Laplace transformation of a function. d) Find the Directional derivative of the function f = x² + y² at a point p (1,1) in the direction ä2î - 4j e) State Green's theorem in plane. f) Find the Laplace transformation of the unit impulse function 8(t-22017) and The unit step function U(t-22017) g) Find the Fourier sine series of the function f(x)=-100¹0(-n < x <n); f(x)= 100¹0(0<x<n) h) Find a parametric representation of the Parabolic equation z = 9(x² + y²) i) j) (1; 0 < t < 1 Find L[f(t)]. Where f(t) = 2; 2 <t<4 (0; t> 4 Find the value of L-1 s² +6 [(s²+1)(s+4)]