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

The formula for percentage error is

In the measurement of a physical quantity X = (A^(2)B)/(C^(1//3)D^(3)) . The percentage errors introduced in the measurement of the quantites A,B,C and D are 1%, 3% , 4% and 5% respectively . Then the minimum amount of percenatage of error in the measurment of X is contributed by

The percentage error in the measurment of mass of a body is 0.75% and the percenatage error in the measurement of its speed is 1.85%. Then the percentage error in the measurement of its kinetic energy is

The heat dissipated in a resistance can be determined form the relation : H = (I^(2)Rt)/(4.2) cal . If the maximum errors in the measurement of current , resistance , and time are 2%, 1%, and 1%, what would be the maximum error in the dissipated heat ?

The radius of a sphere is (5.3 +- 0.1) cm The percentage error in its volume is

If the formula for a physical quantity is X=frac(a^4b^3)(c^frac(1)(3)d^frac(1)(2)) and if the percentage error in the measurements of a,b,c and d are 2%, 3%, 3 % and 4% respectively. Calculate percentage error in X.

Let x={:[(a^(2)b^(2))/(c)]:} be the physical quantity. If the percentage error in the measurement of physical quantities a,b, and c is 2,3 and 4 per cent respectively, then percentage error in the measurement of x is

Express z = sqrt2 . e ^((3pi)/( 4) i ) in the a + ib from .