On heating a uniform metallic cylinder length increases by 3%. The area of cross-section of its base will increase by

on heating a cylindrical metallic rod, its length increases by 2% . Then area of cross section of rod will

If the length of a cylinder on heating increases by 2% , the area of its base will increase by

If the length of a conductor is increased by 100% keeping its area of cross-section constant, the percentage increase in its resistance is

When the length and area of cross-section both are doubled, then its resistance

A wire of cross-sectional area A breaks due to its own weight when length of the wire is l. If area of cross-section of the wire is made 3A then maximum length of the wire can be hung without breaking is

A wire of mass m length I, density d, and area of cross section A is stretched in such a way that is length increases by 10% of its original value, Expresss the changed resistance in percentage.

Considering a wire of non-uniform cross-section as shown.If the area of cross-section at A is double of the area of cross-section at point B.Ratio of heat energy dissipated in a unit volume per unit time at points A and B is

A bar of mass m and length l is hanging from point A as shown in figure.Find the increase in its length due to its own weight. The young's modulus of elasicity of the wire is Y and area of cross-section of the wire is A.

A bar of mass m and length l is hanging from point A as shown in figure.Find the increase in its length due to its own weight. The young,s modulus of elasicity of the wire is Y and area of cross-section of the wire is A.

A bar of mass m and length l is hanging from point A as shown in the figure . If the Young's modulus of elasticity of the bar is Y and area of cross - section of the wire is A, then the increase in its length due to its own weight will be