The mass, radius of cross section and length has experimental value of `(0.3 +- .003)g, (0.5 +- 0.005) mm & (6 +- 0.06)` cm. Find, out the error in the measurement of density of the material.

The measured values of mass radius and length of a wire are respectively , (0.3 +- 0.003 ) g , ( 0.5 +- 0.005) mm and (6 +- 0.06 ) cm. The maximum percentage error in the computed value of the density of the material of the wire would be

Find value : (Iv) 0.03 × 0.3

If cos theta = 0.6 find the value of 5 sin theta -3 tan theta .

If one measures the length of an obejct to be 2.70 mm with an instrument of least count 0.01 mm. what is the percentage error in the measurement?

The coefficient of viscosity of a liquid flowing through a narrow tube is given by eta=(pipr^(4))/(8Vl) where r and l are the radius and the length of the tube p is the pressure difference between its two ends and V is the volume of liquid flowing per unit time. Here the values of p,r,V and l are 75 cm Hg, 0.35 cm, 1.5 cm^(3)//s and 20.5 cm. respectively , the errors in their measurement are 0.1 cm Hg. 0.01 cm, 0.1 cm^(3)//s and 0.1 cm. respectively. Estimate the percentage error in the computed value of eta .

The length of a side of a cube is 10 cm , if an error of 0.05 cm is made in measuring the side find the differential of volume (dv) and the approximate error.

The density of the material of a cube can be estimated by measuring its mass and the length of one of its sides. If the maximum error in the measurement of mass and length are 0.3% and 0.2% respectively, the maximum error in the estimation of the density of the cube is approximately

What do you mean by 'differential of a function? The radius of a sphere was found by measurement as 20 cm. if the maximum error in this measurement is 0.05 cm , find the maximum error that will occur. In the computation of the curved surface of the sphere.