Steve drove at a constant rate to the beach for a vacation. In the equation below, t is the time in hours it took Steve to drive to the beach. 66t = 462 What is the unit rate in the equation above?
The unit rate in the equation above is 66.
To find the unit rate in the equation, we need to first solve for t. By dividing both sides of the equation by 66, we can isolate the variable t:
66t = 462
t = 462/66
Now, let's simplify the fraction:
t = 7
The unit for time is hours, so the unit rate in the equation is 7 hours.
To find the unit rate in the given equation, we need to divide the constant value by the coefficient of t.
The given equation is 66t = 462.
To isolate t, we divide both sides by 66:
66t/66 = 462/66.
Simplifying:
t = 7.
So, it took Steve 7 hours to drive to the beach.
Now, to find the unit rate, we divide the constant value (462, representing the distance) by the time (7 hours):
Unit rate = Distance/Time = 462/7.
Calculating:
Unit rate = 66.
Therefore, the unit rate in the equation is 66.