Assertion: If x and y are the distances along x and y axes respectively then the dimensions of
`(d^(3)y)/(dx^(3))` is `M^(0)L^(-2)T^(0)`
Reason: Dimensions of `int_(a)^(b) ydx` is `M^(0)L^(2)T^(0)`

Statement-I : If x and y are the distance along x and y axes respectively then the dimensions of (d^(3)y)/(dx^(3)) is M^(0)L^(-2) T^(@) Statement-II : Dimensions of underset(a)overset(b)(int) ydx is M^(0)L^(2)T^(@)

Dimension of a physical quantity is M^(a)L^(b)T^(c) , then it is ......

If y=5 cos x-3 sin x , prove that (d^(2)y)/(dx^(2)) + y= 0

If x= t^(2) and y= t^(3) , then (d^(2)y)/(dx^(2)) is equal to

If x= t^(2) and y= t^(3) , then (d^(2)y)/(dx^(2)) is equal to

(a) In the formula X=3YZ^(2) , X and Z have dimensions of capcitnce and magnetic inlduction, respectively. What are the dimensions of Y in MKSQ system? (b) A qunatity X is given by epsilon_(0) L ((Delta)V)/((Delta)r) , where epsilon_(0) is the permittivity of free space, L is a lenght, DeltaV is a potential difference and Deltat is a time interval. Find the dimensions of X . (c) If E,M,J and G denote energy , mass , angular momentum and gravitational constant, respectively. find dimensons of (E J^(2))/(M^(5) G^(2)) (d) If e,h,c and epsilon_(0) are electronic charge, Planck 's constant speed of light and permittivity of free space. Find the dimensions of (e^(2))/(2epsilon_(0)hc) .

Verify that the function y = e^(-3x) is a solution of the differential equation (d^(2)y)/(dx^(2)) + (dy)/(dx) - 6y = 0

If the dimensions of a physical quantity are given by M^(x) L^(y) T^(z) , then physical quantity may be

If x^(m).y^(n)= (x+ y)^(m+n) then show that, (d^(2)y)/(dx^(2))=0

The order of the differential equation 2x^(2) (d^(2)y)/(dx^(2))-3(dy)/(dx) + y = 0 is