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, gamma` respectively. Then the maximum % error in the quantity `X` 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

A physical quantity X is give by the relation X = (2k^(3)l^(2))/(msqrt(n)) The percentage error in the meansurement of k ,I,m and n are 1% ,2%, 3% and 4% respectively The value of X is uncertain by

The percentage errors in the measurement of mass and speed are 2% and 3% , respectively . How much will be the maximum error in the estimation of KE obtained by measuring mass and speed?

If the percentage errors of A,B,and C are a, b, and c, respectively ,then the total percentage error in the product ABC is

A physical quantity X is related to four measurable quantities a, b, c and d as follows X=a^(2)b^(3)c^((5)/(2))d^(-2) . The percentange 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.

If the formula for a physical quantity is W=(a^(4)b^(3))/(c^(2)sqrt(d)) and if percentage errors in the measurement of a, b, c and d are 1%, 2%, 3% and 4% respectively. Find the percentage error in W.

Dimension of a physical quantity is M^(a)L^(b)T^(c) , then it is ......

The resistance R of a wire is given by the relation R= (rhol)/( pir^(2)) . Percentage error in the measurement of rho, l and r is 1 % , 2% and 3% respectively. Then the percentage error in the measurement of R is

A physical quantity P is related to four observable a, b, c and d as follows : P=(a^(3)b^(2))/(sqrtcd) 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 above relation turns out to be 3.763 to what value should you round off the result?

A physical quantity P is related to four observables a,b,c and d as follows: P = a^(3)b^(2)/(sqrtcd) 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 above relation turns out to be 3.763, to what value should you round off the result ?