Question3. Malik's salary is per year, which he expects will increase by a constant dollar amount annually. In 12 years, his salary will have doubled. Assuming salar increases take place only at the end of a full year, how many years must Malik wait until his salary is at least \$40,000 annually?
Studdy Solution
STEP 1
1. Malik's current salary is 40,000.
STEP 2
1. Determine the annual increase in salary.
2. Set up an equation to find the number of years until the salary reaches at least $40,000.
3. Solve the equation to find the number of years.
STEP 3
Determine the annual increase in salary.
Since Malik's salary doubles in 12 years, his salary after 12 years will be $2 \times 25,500 = 51,000.
The increase in salary over 12 years is $51,000 - 25,500 = 25,500.
The annual increase is therefore:
STEP 4
Set up an equation to find the number of years until the salary reaches at least $40,000.
Let be the number of years it takes for the salary to reach at least $40,000. The salary after \( n \) years is given by:
Substitute the annual increase from Step 1:
STEP 5
Solve the equation to find the number of years.
First, simplify the inequality:
Multiply both sides by 12 to clear the fraction:
Divide both sides by 25,500 to solve for :
Since must be a whole number (as salary increases occur annually), round up to the nearest whole number:
Malik must wait at least years for his salary to reach at least $40,000 annually.
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