![rvj0444073603](/avatars/22996.jpg)
rvj0444073603
28.08.2019 •
Mathematics
Marie has renters insurance that she must pay twice a year. if each payment is $96, how much money should she set aside each month to cover her renters insurance? $48
Solved
Show answers
More tips
- S Society and Politics Выборы: Смысл, Значение и Отражение...
- L Leisure and Entertainment History of International Women s Day: When Did the Celebration of March 8th Begin?...
- S Style and Beauty Intimate Haircut: The Reasons, Popularity, and Risks...
- A Art and Culture When Will Eurovision 2011 Take Place?...
- S Style and Beauty How to Choose the Perfect Hair Straightener?...
- F Family and Home Why Having Pets at Home is Good for Your Health...
- H Health and Medicine How to perform artificial respiration?...
- H Health and Medicine 10 Tips for Avoiding Vitamin Deficiency...
- F Food and Cooking How to Properly Cook Buckwheat?...
- F Food and Cooking How Many Grams Are In a Tablespoon?...
Answers on questions: Mathematics
- M Mathematics Find the x - and y -intercepts of the graph of the linear equation -4x+8y=-16 . The x -intercept is . The y -intercept is ....
- E English In the scarlet letter, what does chillingworth mean when he mutters, a strange sympathy betwixt soul an body? were it only for the arts sake, i must search this matter...
- C Chemistry Find the molar mass of iron (III) nitrate, Fe(NO3)3...
Ответ:
$16
Step-by-step explanation:
Given: Marie has renters insurance that she must pay twice a year.
The amount of each payment = $96
So, the total payment in the year =![2\times96=\$192](/tpl/images/0205/6343/4842e.png)
Since, in one year = 12 months
Therefore, the amount of money she should set aside each month to cover her renters insurance=![\frac{192}{12}=16](/tpl/images/0205/6343/adcf8.png)
Hence, She should set aside $16 each month to cover her renters insurance.
Ответ:
The solution of the equation x2+7x is 0, -7 using the quadratic formula.
Step-by-step explanation:
x2 + 7x = 0
-b ± √ b2 - 4(ac)/ 2a
substitution,
a = 1, b = 7, c = 0
= -7 ± √(7)2 - 4(1 x 0) / 2 x 1
= - 7 ± 7 / 2
x = 0 , -7