If `A = B +(C)/(D+E)` the dimensions of B and C are `[M^(0)L T^(-1)]` and `[M^(0)LT^(0)]` , respectively . Find the dimensions of A, D and E.

In A B C ,\ D and E are the mid-points of A B and A C respectively. Find the ratio of the areas of A D E and A B C .

Suppose A=B^(n)C^(m) , where A has dimensions LT, B has dimensions L^(2)T^(-1) , and C has dimensions LT^(2) , Then the exponents n and m have the values: (A) 2//3,1//3 " " (B) 2,3 " " (C) 4//5,-1//5 " " (D) 1//5,3//5 (E) 1//2,1//2

If the dimensions of B^(2)l^(2)C are [M^(a)L^(b)T^(c)] , then the value of a+b+c is [Here B,l and C represent the magnitude of magnetic field, length and capacitance respectively]

If the dimensions of B^(2)l^(2)C are [M^(a)L^(b)T^(c)] , then the value of a+b+c is [Here B,l and C represent the magnitude of magnetic field, length and capacitance respectively]

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

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

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^(@)