Jaden has a part time job working for a landscaping company he earns $25 for each lawn mowing job ,l, 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 lawn-mowing jobs and 6 pulling weeds jobs
To find out how much money Jaden will earn for 4 lawn-mowing jobs, we substitute l=4 into the expression 25l:
25(4) = 100
Jaden will earn $100 for 4 lawn-mowing jobs.
To find out how much money Jaden will earn for 6 pulling weeds jobs, we substitute w=6 into the expression 20w:
20(6) = 120
Jaden will earn $120 for 6 pulling weeds jobs.
To find how much money Jaden will earn for lawn-mowing jobs and pulling weeds jobs, you can use the given equation:
Earnings = 25l + 20w
Substituting l = 4 and w = 0.6, we can evaluate the equation as follows:
Earnings = 25(4) + 20(0.6)
= 100 + 12
= $112
Therefore, Jaden will earn $112 for 4 lawn-mowing jobs and 6 pulling weeds jobs combined.
To find out how much money Jaden will earn for lawn-mowing jobs and pulling weeds jobs, we need to substitute the given values of l and w into the formula 25l + 20w.
Given:
l = 4 (number of lawn-mowing jobs)
w = 0.6 (number of pulling weeds jobs)
Now, we can substitute these values into the formula and calculate the amount of money earned for each type of job:
Money earned for lawn-mowing jobs:
25l = 25 * 4 = 100
Money earned for pulling weeds jobs:
20w = 20 * 0.6 = 12
Therefore, Jaden will earn $100 for lawn-mowing jobs and $12 for pulling weeds jobs.