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DERIVATIONS-I

DERIVATIONS-I

DERIVATIONS-I

DEFINITIONS

DERIVATIONS-II

Assuming the general expression for the displacement of a particle performing SHM, obtain the expressions for its velocity and acceleration as functions of the displacement.

Derive an expression for strain energy and show that the strain energy per unit volume of a stretched wire is proportional to the square of the strain.

Obtain an expression for the critical velocity of a satellite orbiting around the Earth.

Define the following:

(1). Transducer

(2). Bandwidth.

Describe biprism exper4iment to calcularte the wavelength of a monocharomatic light. Draw the necessary ray diagram.

If the critical angle of a medium is sin−1(35), find the po0larising angle.

State and prove theorem of parallel axes.

State and prove theorem of perpendicular axes.

State and prove theorem of parallel axes.

State and prove theorem of perpendicular axes.

State and prove parallel axis theorem

(a) Prove the theorem of perpendicular axes. (b) Prove the theorem of parallel axes.

(a) Prove the theorem of perpendicular axes. (b) Prove the theorem of parallel axes.

(a) Prove the theorem of perpendicular axes.

(b) Prove the theorem of parallel axes.

State and prove the principle / Theorem of parallel axes.

State Theorem of parallel Axes

State parallel axes theorem mathematically?