The percentage errors in quantities P, Q, R and S are 0.5%, 1%, 3% and 1.5% respectively in the measurement of a physical quantity `A=(P^(3)Q^(2))/(sqrtRS)`.
The maximum percentage error in the value of A will be :

Error in the measurement of radius of a sphre is 1%. Then maximum percentage error in the measurement of volume is

The percentage error in measuring M, L and T are 1%, 1.5 % and 3 % respectively. Then the percentage error in measuring the physical quantity with dimensions ML^(-1)T^(-1) is :

If P=a^2*b^3*c*d^1/2 and the percentage error in a,b,c and d are 1%,2%,3% and 4% respectively.Find percentage error in P.

The percentage error in measurements of length and time period is 2% and 1% respectively . The percentage error in measurements of 'g' 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 quantites A,B,C and D are 1%, 3% , 4% and 5% respectively . Then the minimum amount of percenatage of error in the measurment of X is contributed by

If percentage error in a, b, c, d are 1% 2% 3% and 4% respectively. What will be the percentage error in X= (a^(1//3)b^4)/(cd^(2//3))

A physical quantity P is related to four observables a, b, c and d as P=a^(3)b^(2)//sqrtcd . The percentage errors in the measurements of a, b, c and d are 1%, 3% 4% and 2% respectively. What is the percentage error in the quantity P? If the value of P calculated using this formula turns out to be 3.763 , to what value should you round off the result?

Percentage error in mass and momentum are 3% and 2% respectively. Maximum possible percentage error in the kinetic energy is