The error in the measurement of length (L) of time simple pendulum is 0.1% and the error in the period (T) is 3%. The maximum possible error in the measurement of `(L)/(T^(2))` is

The error in the measurement of the sides of a rectangle is 1%. The error in the measurement of its area is

If Y = a-b , the maximum percentage error in the measurement of Y will be

If Y = a//b , the maximum percentage error in the measurement of Y will be

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 error in measurement of radius of a sphere is 0.1% then error in its volume is -

If the length of simple pendulum is increased by 300%, then the time period will be increased by

If length of a simple pendulum is increased by 44%, then what is the gain in the time period of pendulum?

Assertion: The error in the measurement of radius of sphere is 0.3% . The permissible error in its surface area is 0.6 % . Reason: The permissible error is calculated by the formula (Delta A)/(A) = (4 Delta r)/( r) .

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

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