Question 1

Ali's starting salary at her new job is

$4,300. It is expected to increase by 32
each year. What will Ali's salary be in 10
years?

Question 2

Answer:

4630

Explanation:

32 is one year right?

So multiply

10x32=320 then add 4300+320

= 4630

Question 3

Answer:

663268.49

Explanation:

Time, t = 10 Initial salary

P = 41300 rate

r = 32

Final salary = P(1+r/100)^t = 41300(1+32/100)^10

$41300\left((1+32)/(100)\right)^(10)$

$\mathrm{Apply\:exponent\:rule}:\quad \left((a)/(b)\right)^c=(a^c)/(b^c)$

$\left((1+32)/(100)\right)^(10)=(\left(1+32\right)^(10))/(100^(10))$

$=41300\cdot (\left(1+32\right)^(10))/(100^(10))$

$\mathrm{Add\:the\:numbers:}\:1+32=33$

$=41300\cdot (33^(10))/(100^(10))$

$=(41300)/(1)\cdot (33^(10))/(100^(10))$

$\mathrm{Apply\:the\:fraction\:rule}:\quad (a)/(b)\cdot (c)/(d)=(a\:\cdot \:c)/(b\:\cdot \:d)$

$=(41300\cdot \:33^(10))/(1\cdot \:100^(10))$

$\mathrm{Apply\:rule}:\quad \:a\cdot 1=a$

$1\cdot \:100^(10)=100^(10)$

$=(41300\cdot \:33^(10))/(100^(10))$

$\mathrm{Factor\:the\:number:\:}\:41300=100\cdot \:413$

$=(100\cdot \:413\cdot \:33^(10))/(100^(10))$

$=(413\cdot \:33^(10))/(100^9)$

=663268.48697974...

$\mathrm{Round:}$ 663268.49

~Lenvy~

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