High student loan payments can affect many decisions but not the decision of getting married.
<h3>What are the effects of high student loan payments?</h3>
High student loan payments mainly affect the money people have every month after paying the loan. This factor can affect money-related decisions such as:
- The money they can spend on food, housing, clothing, etc.
- The possibility of buying a house or a car.
- The amount of money they can save.
<h3>What life decisions are not affected?</h3>
Decisions that are not directly related to money such as getting married are not affected by high loan payments.
Note: This question is incomplete because the options are missing; here is the missing section:
a)getting married
b)buying a car
c)being able to afford food
d)buying a house
Learn more decisions in: brainly.com/question/14019418
ANSWER:
Sorry too
Explanation:
The most important factor to consider for a nurse when interpreting this client’s pain behavior is the client's cultural identity. This issue is fundamental for providing good healthcare services.
The client's cultural identity refers to the systems of beliefs and moral values of the society in which a patient (client) developed.
The client's cultural identity represents a fundamental aspect when providing healthcare services.
Cultural identity may or not include issues associated with sexual orientation, identity, economic status, religion, etc.
Learn more about cultural identity here:
brainly.com/question/5591199
I think it's FedBizOpps but you could try it. Hopes this helps.
Answer:
4
Explanation:
Since it's a flippy number, we can set each digit into ababa
Since it can be divisible by 15, which means it can be divisible by both 5 and 3.
Since it is divisible by 5, the last digit will be either 0 and 5, but it cannot be 0 because 0 cannot be the first digit, so last digit must be 5.
So, ababa --> 5b5b5
It can also be divisible by 3. According to de divisibility rule of 3, if the sum of all digit is divisible by 3 then the number is divisible by 3.
Sum of all digits = 15 + 2b
it's divisible by 3 when b = 0,3,6,9
The answer is 4.
There are 4 such number.