Question%0D%0A11. A local moving company charges a flat fee of $500 for the first 3 hours of all moves and $100 for each additional hour. The moving company uses the formula M(t)=100(t−3)+500, when t3 to determine the cost of each move, M, based on the amount of time needed, t, in hours.%0D%0A%0D%0AUsing the equation, complete the given table.%0D%0A%0D%0A(4 points)%0D%0AFunction%09Cost of Moving%09Interpretation%0D%0AM (4)%09$%0D%0A%0D%0AM(8)%09$

Question

Question%0D%0A11. A local moving company charges a flat fee of $500 for the first 3 hours of all moves and $100 for each additional hour. The moving company uses the formula M(t)=100(t−3)+500, when t>3 to determine the cost of each move, M, based on the amount of time needed, t, in hours.%0D%0A%0D%0AUsing the equation, complete the given table.%0D%0A%0D%0A(4 points)%0D%0AFunction%09Cost of Moving%09Interpretation%0D%0AM (4)%09$%0D%0A%0D%0AM(8)%09$

GPT-4o mini · Answer

To complete the table using the given formula $ M(t) = 100(t - 3) + 500 $ for $ t > 3 $, we need to substitute the values of $ t $ into the equation.

For $ M(4) $: \[ M(4) = 100(4 - 3) + 500 \] \[ = 100(1) + 500 \] \[ = 100 + 500 \] \[ = 600 \]
For $ M(8) $: \[ M(8) = 100(8 - 3) + 500 \] \[ = 100(5) + 500 \] \[ = 500 + 500 \] \[ = 1000 \]

Now we can complete the table:

| Function | Cost of Moving | Interpretation | |-----------|----------------|------------------------------------| | $ M(4) $ | $600 | Cost for 4 hours of moving | | $ M(8) $ | $1000 | Cost for 8 hours of moving |