V=df-di/tf-tf; solve for tf
Please show step by step procedure so I can understand how to solve this. Many thanks.
V = (df-di)/(tf-ti)
tf-ti = (df-di)/V
tf = ti + (df-di)/V
To solve for tf in the equation V=df-di/tf-tf, you can follow these steps:
Step 1: Begin by multiplying both sides of the equation by (tf - tf) to eliminate the denominators:
(tf - tf) * V = (tf - tf) * (df - di) / (tf - tf)
Step 2: Simplify the equation:
0 = (df - di)
Step 3: Since 0 is equal to (df - di), this means that df is equal to di. Therefore, any value of tf would satisfy the equation.
In simpler terms, there is no specific solution for tf in this case. The value of tf can be any real number, as long as df is equal to di.
Please note that the original equation might contain a mistake or be incomplete, as it does not yield a specific solution for tf.