Given `Z = (A^4B^(1//3))/(CD^(3//2))`where A, B, C & D are physical quantity. What will be the maximum -percentage error in Z?

Given Z = (A^(4)b^(1//3))/(CD^(3//2)) where A,B,C and D are physical quantity. What will be the maximum percentage error in Z.

What is the maximum possible relative error in Z, where Z =A^n B^m ?

A physical quantity P=(a^(3)b^(2))/(sqrt(cd)) the percentage errors in measurement in a,b,c,d are 1%, 3%,4% and 2% respectively. What is the percentage error in measurement of quantity P?

A physical quantity P is related to four observables a, b, c and d as follows: P = (a^(3)b^(3))/(sqrt(cd)) The percentage errors of measurement in 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 the given relation turns out to be 3.763, to what value should the result be rounded off?

A physicaI quantity P is reIated to four observabIes a, b, c and d as foIIows: P = a^(3)b^(2)//(sqrt(cd)) The percentage errors of measurement in a,b, c and d are 1%, 3%, 4% and 2%, respectiveIy. What is the percentage error in the quantity P? If the vaIue of p caIcuIated using the above reIation turns out to be 3.763 to what vaIue shouId you round off the resuIt?

The distance x of a particle from a fixed point at time t is given by, x = 5 + A sin 2t + B cos 2t, where A and b are given to be 3 and 4 respectively. However, it is found on measurement that there is a 1% erroe in the maximum value of x and this is due to an error in A only. Find the percentage error in A.