Given,`Z=(a^(3)b^(2)c^(1/3))/(sqrt(d))` .The Percentage errors in measurement of a , b , c and d are respectively 1/3 % , 1/2 % , 3% , 2% . Find the value of % error in the measurement of Z

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

A physical quantity z depends on four observables a, b, c and d, as z = (a^2b^(2/3))/(sqrtc d^3) . The percentages of error in the measurement of a, b, c and d are 2%, 1.5%, 4% and 2.5% respectively. The percentage of error in z is :

The percentage error in the measurement of mass and speed are 2% and 3% respectively. Maximum estimate of percentage error of K.E

The percentage error in the measurement of the voltage V is 3% and in the measurement of the current is 2%. The percentage error in the measurement of the resistance 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 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 :

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

The resistance R of a wire is found by determining its length l and radius r. The percentage errors in measurement of l and r are respectively 1% and 2%. The percentage error in measurement of R is

A physical quantity X is give by the relation X = (2h^(3)I^(2))/(2sqrt(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