A physical quantity Q is related to measurable quantities L,M and N as `Q = KL^(-2)M^(2)N^(3)`, where k is constant. If the % errors in the measurements of L, M and N are respectively 1%, 2% and 1%, then the % error in hc mcasurement of Q is

The error in the measurement of the radius of a sphere is 1% . Find the error in the measurement of volume.

A physcial quantity X is related to four measurable quantites a, b, c and d as follows : X = a^2 b^3 c^(5//2) d^(-2) The percentage error in the measurement of a, b, c and d are 1% , 2%, 3% and 4%, respectively. What is the percentage error in quantity X ? if the value of X calculated on the basis of the above relation is 2.763, to what value should you round off the result ?

The percentage error in measurements of length and time period is 2% and 1% respectively . The percentage error in measurements of 'g' is

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 :

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

If error in measurement of radius of a sphere is 1%, what will be the error in measurement of volume?

If the error in the measurement of radius of a sphere in 2% then the error in the determination of volume of the spahere will be

In the measurement of a physical quantity (L), the formula used is L=k(m xx n) , where k is a constant and m and n are the quantities to be measured. If the % errors in m and n are respectively 3% and 5%. The % error in the measurement of L is

The error in the measurement of the radius of a sphere is 1%. The error in the measurement of volume is