Simple Harmonic Motion Concepts

It involves complex waveforms.

It is a combination of linear and circular motion.

It is represented by a single sine or cosine wave.

It requires multiple trigonometric functions.

To make calculations more complex.

To disguise the motion for educational purposes.

To avoid using trigonometric functions altogether.

To utilize trigonometric identities for simplification.

Pythagorean identity

Sum and difference identities

Double angle identity

Half angle identity

cos(2θ) = 1 + 2cos²(θ)

cos(2θ) = sin²(θ) + cos²(θ)

cos(2θ) = 2cos²(θ) - 1

cos(2θ) = 1 - 2sin²(θ)

It eliminates the need for trigonometric functions.

It helps in identifying the phase shift.

It simplifies the equation to a linear form.

It transforms the equation into a recognizable harmonic form.

By finding the maximum value of the function.

By identifying the constant term in the equation.

By calculating the average of the sine and cosine coefficients.

By setting the equation equal to zero.

The coefficient of the cosine term.

The initial value of the function.

The constant term in the equation.

The difference between maximum and minimum values.

By checking the sign of the cosine term.

By evaluating the function at t = 0.

By analyzing the frequency of the motion.

By observing the phase shift in the equation.

It determines the frequency of oscillation.

It introduces a phase shift.

It affects the amplitude of the wave.

It sets the baseline or center of motion.

By comparing it with the original equation.

By checking if it matches a known trigonometric identity.

By substituting values and checking for consistency.

By ensuring it has no trigonometric terms.