Form the partial differential equation from π(π₯+π¦+π§,π₯2+π¦2+π§2) = 0
6.A] Form the partial differential equation from π(π₯ + π¦ + π§, π₯2 + π¦2 + π§2) = 0 Answer:-
6.A] Form the partial differential equation from π(π₯ + π¦ + π§, π₯2 + π¦2 + π§2) = 0 Answer:-
5.B] Solve , given that when x = 0, z = 1 and
6.A] Form the partial differential equation from π(π₯ + π¦ + π§, π₯2 + π¦2 + π§2) = 0 Answer:
5.A] Form the partial differential equation by eliminating the arbitrary function from the relation ππ₯ + ππ¦ + ππ§ = π(π₯2 + π¦2 + π§2). Answer:
8. B) Using Lagrangeβs interpolation formula, fit a polynomial which passes through the points (β1, 0), (1, 2), (2, 9) and (3, 8) and hence estimate the value of yβ¦
6.C] Solve = Z given that when y=0, z=ex and = e-x . Answer:-
4.A] If πΉβ = (5π₯π¦ β 6π₯2)π+ (2π¦ β β4π₯)π, evaluate β«c πΉβ β ππβ along the curve πΆ: π¦ = π₯3 in the π₯π¦ βplane from the point (1,β¦
5.A] Form the partial differential equation from the relation π§ = π(π₯ + ππ‘) + π(π₯ β ππ‘). Answer:
6.B] Solve π₯2(π¦ β π§)π + π¦2((π§ β π₯)π = π§2(π₯ β π¦) Answer:-
2.A] Evaluate (x2+y2 )dxdy by changing into polar coordinates. Answer: