In the expression `A = (xy^(3))/(Z^(2))` the percentage error is given by

A physical quantity Q is calculated according to the expression Q=(A^(3)B^(3))/(CsqrtD) If percentage errors in A, B, C, D are 2%, 1%, 3% and 4% respectively. What is the percentage error in Q ?

An experiment measure quantities x,y,z and then t is in calculate from the data as t = (xy^(2))/(z^(2)) if percentage error in x,y,z and are respectively 1% ,3%,2% then percentage error in t is

An experiment from X = (a^(1//2) b^(2))/( c^(3)) . If the percentage errors in a, b , and c are +- 1% , +- 3% , and +- 2% , respectively , then the percentage error in X can be

A physical quantity Y is expressed as Y= (p^2)/(r )((q)/(sqrt(s)))^3 If the percentage error in the measurement of p,q,r and s are 4%, 2%, 1% and 3% respectively, caluclate the percentage error in Y.

A physical quantity Q is found ot depend on observables x, y and z obeying relation Q=(x^(3)y^(2))/(z). The percentage error in the measurments of x, y and z are 1%,2%and 4% respectively. What is percentage error in the quantity Q?

A physical quantity y is given by y=(P^2Q^(3//2))/(R^4S^(1//2)) The percentage error in A,B , C and D are 1%,2%, 4% and 2% respectively. Find the percentage error in y.

The relation gives the value of 'x' x=(a^(3)b^(3))/(csqrt(d)) Find the percentage error in 'x' if the percentagr error in a,b,c and d are 2%, 1%, 3% and 4% respectively.

Find the relative error in Z, if Z =(A^(4)B^(1//3))/(CD^(3//2) and the percentage error in the measurements of A,B,C and D are 4%,2%,3% and 1%, respectively.