Answer:
The money you will have is $98020.
Explanation:
It is given that grandparents deposit $2,000 each year on birthday and the account pays 7% interest compounded annually also the time is 21 years.
we will use the compound interest formula 
.
For the first birthday the amount after 21 yr will be:
Similarly for the second birthday amount after 20yr will be:
likewise, the last compound will be:
The total value of such compounding would be
:
![\text {Total amount}=2000[(1+\frac{7}{100})^{21}+(1+\frac{7}{100})^{20}...(1+\frac{7}{100})^{1}]](https://tex.z-dn.net/?f=%5Ctext%20%7BTotal%20amount%7D%3D2000%5B%281%2B%5Cfrac%7B7%7D%7B100%7D%29%5E%7B21%7D%2B%281%2B%5Cfrac%7B7%7D%7B100%7D%29%5E%7B20%7D...%281%2B%5Cfrac%7B7%7D%7B100%7D%29%5E%7B1%7D%5D)
The total amount just after your grandparents make their deposit is:
≈($96020+2000)
≈$98020
Hence, the money you will have is $98020.
Answer:
this took me a whileee ;D
eazzzyyy 50
<span>Prefer the 6.1 percent tax-exempt investment.
Let's do the math and see why the tax-exempt investment is the better choice. For the 8.1% taxable investment, you get taxed at the rate of 28%. Which means that you only get to keep 100%-28% = 72% of your gains. So 0.72 * 8.1 = 5.832 which means your effective earning percentage is only 5.832% which is less than the 6.1% rate you get for the tax-exempt investment. Another consideration that wasn't taken into account for the question is the earnings on the taxable investment may push you up into a higher tax bracket. Which in turn increases the tax burden on your other investments. So the better choice here is the 6.1% tax-exempt investment even though that first glance the 8.1% investment looks higher.</span>
Answer:
B) low social rapport and direct interaction
Explanation:
Since this teams are usually not located in the same place. The rapport and the interaction is low.
