Micah takes a job with a starting salary of $78,000 for the first year. He earns a 4% increase each year. How much does Micah make over seven years?

So his job has a starting salary of $78,000 and he gets a 4% increase each year. 4% of 78,000 is 3120 since 3120 divided by .04 equals 78,000, and 78,000+3120 = 81120 x 7= 567,840. So every year he can make $81120 and multiply that by 7, Mica would earn $567,840 every 7 years with the 4% increase in his salary every year.

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Blacklash Blacklash · Answer 2 · 2019-07-03T13:11:17+02:00

Answer:

Micah make 616066.97 $ over seven years

Step-by-step explanation:

This increase is in the form of a geometric progression.

Micah takes a job with a starting salary of $78,000

First term of GP = $78,000

He earns a 4% increase each year

Common ratio [tex]=1+\frac{4}{100}=1.04[/tex]

Sum of n terms of GP with first term a and common ratio r.

[tex]s_n=\frac{a(r^n-1)}{r-1}[/tex]

How much does Micah make over seven years, so wee need to find sum of GP when n = 7.

[tex]s_7=\frac{78000(1.04^7-1)}{1.04-1}=616066.97\$[/tex]

Micah make 616066.97 $ over seven years