Which variable is solved for in the equation X = V(initial)T + 1/2 AT^2?

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Multiple Choice

Which variable is solved for in the equation X = V(initial)T + 1/2 AT^2?

Explanation:
The equation \( X = V_{\text{initial}}T + \frac{1}{2}AT^2 \) is a kinematic equation that describes the motion of an object under constant acceleration. In this equation, \( X \) represents the total distance traveled by the object, \( V_{\text{initial}} \) is the initial velocity, \( A \) is the acceleration, and \( T \) is the time. When analyzing the components of the equation, it’s clear that the left side, \( X \), is being defined in terms of the other variables on the right side of the equation. The equation is structured to calculate the distance \( X \) covered in a time \( T \) when starting from an initial velocity \( V_{\text{initial}} \) and undergoing a constant acceleration \( A \). Thus, the answer is distance because the equation explicitly gives a relationship where \( X \) is derived based on the other parameters related to motion, making it clear that solving for \( X \) yields the distance traveled. The equation is derived from basic principles of motion, and when used, allows one to find how far an object travels when given initial conditions such as its starting speed, the

The equation ( X = V_{\text{initial}}T + \frac{1}{2}AT^2 ) is a kinematic equation that describes the motion of an object under constant acceleration. In this equation, ( X ) represents the total distance traveled by the object, ( V_{\text{initial}} ) is the initial velocity, ( A ) is the acceleration, and ( T ) is the time.

When analyzing the components of the equation, it’s clear that the left side, ( X ), is being defined in terms of the other variables on the right side of the equation. The equation is structured to calculate the distance ( X ) covered in a time ( T ) when starting from an initial velocity ( V_{\text{initial}} ) and undergoing a constant acceleration ( A ).

Thus, the answer is distance because the equation explicitly gives a relationship where ( X ) is derived based on the other parameters related to motion, making it clear that solving for ( X ) yields the distance traveled.

The equation is derived from basic principles of motion, and when used, allows one to find how far an object travels when given initial conditions such as its starting speed, the

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