In euler theorem x ∂z⁄∂x + y ∂z⁄∂y = nz, here ‘n’ indicates?
a) order of z
b) degree of z
c) neither order nor degree
d) constant of z
Q.3.
If z = xn f(y⁄x) then?
a) y ∂z⁄∂x + x ∂z⁄∂y = nz
b) 1/y ∂z⁄∂x + 1/x ∂z⁄∂y = nz
c) x ∂z⁄∂x + y ∂z⁄∂y = nz
d) 1/x ∂z⁄∂x + 1/y ∂z⁄∂y = nz
Q.4.
Necessary condition of euler’s theorem is _________
a) z should be homogeneous and of order n
b) z should not be homogeneous but of order n
c) z should be implicit
d) z should be the function of x and y only
Q.5.
If f(x,y) = x+y⁄y , x ∂z⁄∂x + y ∂z⁄∂y = ?
a) 0
b) 1
c) 2
d) 3
Q.6.
If u = xx + yy + zz , find du⁄dx + du⁄dy + du⁄dz at x = y = z = 1.
a) 1
b) 0
c) 2u
d) u
Q.7.
Find the approximate value of [0.+ 2.+ 1.942](1⁄2).
a) 1.96
b) 2.96
c) 0.04
d) -0.04
Q.8.
The happiness(H) of a person depends upon the money he earned(m) and the time spend by him with his family(h) and is given by equation H=f(m,h)=400mh2 whereas the money earned by him is also depends upon the time spend by him with his family and is given by m(h)=√(1-h2). Find the time spend by him with his family so that the happiness of a person is maximum.
a) √(1⁄3)
b) √(2⁄3)
c) √(4⁄3)
d) 0
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