Answer:
<u>The correct answer is that Deb will have to pay US$ 6,914.25 at the end of the loan.</u>
Step-by-step explanation:
<u>Loan in US$:</u> 6,300
<u>Term:</u> One Year
<u>Interest rate: </u>9.75% annually
1. Let's calculate how much money Deb will pay in interests for the loan:
Loan * Interest rate * Term
6,300 * 0.0975 * 1
<u>614,25</u>
<u>Deb will have to pay US$ 614,25 in interests for the loan</u>
2. Let's calculate how much money Deb will pay back at the end of the loan term
Loan in US$ + Interests in US$
6,300 + 614,25
<u>6,914,25</u>
<u>At the end of the loan Deb will have to pay $ 6,914.25</u>
Answer:
The answer is 1 1/2 = 3/2 1 = 2/2 LCD=2
Answer:
x = 45
y = 15
Step-by-step explanation:
Given that:
x = pineapple smoothies
y = mango smoothies
According to given conditions:
x + y = 60.................... eq1
$2.75 x + $3.25y = $172.50 ............ eq2
By taking eq1
x + y = 60
x = 60 - y
Putting value of x in eq2
$2.75 (60 - y) + $3.25y = $172.50
By simplifying
$165 - $2.75y + $3.25y = $172.50
Adding like terms:
$0.5y = $172.50 - $165
$0.5y = $7.5
Dividing both sides by $0.5
y =7.5/0.5
y =15
Putting value of y in eq 1
x + 15 = 60
x = 60 -15
x = 45
So there are 45 pineapple smoothies and 15 mango smoothies.
i hope it will help you!
Answer:
it would be a graph that went up, down, up, up up
Step-by-step explanation:
Given:
The numbers are
.
To find:
All the values that cannot be probabilities.
Solution:
We know that,
![\text{Probability}=\dfrac{\text{Favorable outcomes}}{\text{Total outcomes}}](https://tex.z-dn.net/?f=%5Ctext%7BProbability%7D%3D%5Cdfrac%7B%5Ctext%7BFavorable%20outcomes%7D%7D%7B%5Ctext%7BTotal%20outcomes%7D%7D)
The minimum value of favorable outcomes is 0 and the maximum value is equal to the total outcomes. So, the value of probability lies between 0 and 1, inclusive. It other words, the probability lies in the interval [0,1].
![0\leq \text{Probability}\leq 1](https://tex.z-dn.net/?f=0%5Cleq%20%5Ctext%7BProbability%7D%5Cleq%201)
From the given values only
lie in the interval [0,1]. So, these values can be probabilities.
The values
does not lie in the interval [0,1]. So, these values cannot be probabilities.
Therefore, the correct values are
.