The dimensional formula for a physical quantity `x` is `[M^(-1) L^(3) T^(-2) ]` . The errors in measuring the quantities `M , L , and T,` respectively are `2%, 3% , and 4%`. The maximum percentage of error that occurs in measuring the quantity `x` is

The dimensional formula of physical quantity is [M^(a)L^(b)T^(c)] .Then that physical quantity is

A physical quantity X is represented by X = (M^(x) L^(-y) T^(-z) . The maximum percantage errors in the measurement of M , L , and T , respectively , are a% , b% and c% . The maximum percentage error in the measurement of X will be

The error in the measurement of length and radius of a cylinder are 1% and 2% respectively. The maximum percentage of error in its volume is

A physical quantity is given by X=M^(a)L^(b)T^(c) . The percentage error in measurement of M,L and T are alpha, beta and gamma respectively. Then maximum percentage error in the quantity X is

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

The physical quantity having the dimensions [M^(-1)L^(-3)T^(3)A^(2)] is

In the measurement of a physical quantity X = A^(2)B/C^(1//3)D^(3) The percentage errors introduced in the measurement of the quantities A, B, C and D are 2%, 2%, 4% and 5% respectively. Then, the minimum amount of percentage error in the measurement of X is contributed by

A physical quantity P is described by the relation P=a^(1/2)b^(2)c^(3)d^(-4). If the relative errors in the measurements a, b, c and d respectively, are 2%, 1%, 3%, and 5%, then the relative error in P will be :

In the dimension of a physical quantities are given by M^(0)L^(1)T^(0) , then the physical quantity will be

A Physical quantity P is given by P= (A^2sqrtB)/C , and the percentage errors in the measurements of A, B and C are 1% , 2 % and 4% respectively. Find the percentage error in P.