Jaden has a part-time job working for a landscaping company. He needs $25 for each lawnmowing job L and $20 for each pulling weeds job W this can be modeled by 25L +20 W evaluate for L equals 4NW equals six to find how much money Jaden warrant for for lawn mowing jobs in six pulling weeds jobs.
To find out how much money Jaden made for lawn mowing jobs, we can substitute L = 4 and W = 6 into the expression 25L + 20W:
25(4) + 20(6)
= 100 + 120
= 220
Therefore, Jaden earned $220 for lawn mowing jobs in six pulling weeds jobs.
To find how much money Jaden would earn for 4 lawn mowing jobs and 6 pulling weeds jobs, we need to substitute L = 4 and W = 6 into the given expression.
The expression is: 25L + 20W.
Substituting the values: 25(4) + 20(6).
Evaluating the expression: 100 + 120 = 220.
Therefore, Jaden would earn $220 for 4 lawn mowing jobs and 6 pulling weeds jobs.
To evaluate how much money Jaden earns for four lawnmowing jobs and six pulling weeds jobs, we need to substitute the values of L and W into the equation 25L + 20W.
Given that L = 4 and W = 6, we can substitute these values into the equation:
25(4) + 20(6)
Now, we can perform the calculations:
= 100 + 120
= 220
Therefore, Jaden will earn $220 for the four lawnmowing jobs and six pulling weeds jobs.