Jaden has a part-time job working for a landscaping company. He earns $25 for each lawn-mowing job, 1, and $20 for each pulling-weeds job, w. This can be modeled by 25l + 20w Evaluate for l = 4 and w = 6 to find how much money Jaden will earn for 4 lawn-mowing jobs and 6 pulling-weeds jobs. (1 point)
We can plug in the values for l and w into the expression:
25l + 20w
Substituting l = 4 and w = 6:
25(4) + 20(6)
= 100 + 120
= 220
So, Jaden will earn $220 for 4 lawn-mowing jobs and 6 pulling-weeds jobs.
To evaluate the expression 25l + 20w for l = 4 and w = 6, you substitute these values into the expression.
First, plug in l = 4:
25(4) + 20w
Next, plug in w = 6:
25(4) + 20(6)
Now, simplify the expression:
100 + 120
Finally, add the numbers together:
100 + 120 = 220
Therefore, Jaden will earn $220 for 4 lawn-mowing jobs and 6 pulling-weeds jobs.
To find out how much money Jaden will earn for 4 lawn-mowing jobs and 6 pulling-weeds jobs, we need to substitute the given values of l = 4 and w = 6 into the equation.
The equation that represents Jaden's earnings is 25l + 20w.
Substituting the values, we get:
25(4) + 20(6)
Multiplying, we have:
100 + 120
Adding, we find:
220
Therefore, Jaden will earn $220 for 4 lawn-mowing jobs and 6 pulling-weeds jobs.