How many months are in 6 years?

Answers

Answer 1

Answer: In one year, there are 12 months. So, to find out the amount of months there are in 6 years, all we need to do is multiply 12 * 6.

12 * 6 = 72

And that is our answer.

There are 72 months in 6 years.
Hope that helped =)

Answer 2

Answer:

We can see here that there are 72 months in 6 years. It is gotten by multiplying 12 months by 6 years.

What is month?

A month is a unit of time commonly used in calendars to divide a year into shorter periods. It is based on the approximate time it takes for the Moon to orbit the Earth, which is roughly 29.5 days. To account for the varying lengths of months, the Gregorian calendar, the most widely used civil calendar, has months of different durations: 28, 30, or 31 days.

To calculate the number of months in a given number of years, you multiply the number of years by 12 since there are 12 months in a year. Therefore, 6 years multiplied by 12 months equals 72 months.

Learn more about month on brainly.com/question/30403028

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If x is a real number such that x^3 =64 then x^2 + x=?

7/4x-5 + 2y - 3.5 + -1/4x + 5

Answers

-7/4+2y+1/4x is the answer

Luke saves 10p coins and 20p coins he has 3 times as many 10p coins as 20p coins a total of 17 pounds how 10p coins does he have ?

Answers

Answer:

10p coins does he have 102

Step-by-step explanation:

given data

saves= 10p coins and 20p coins

total = 17 pounds

to find out

how 10p coins does he have

solution

we consider here no of 20p coin = x

so equation will be here

3 × 10 x +20 x = 1700

30 x + 20 x = 1700

x = 34

so that

10p coins = 3 time × 34 = 102

20p coins = 34

so that 10p coins does he have 102

Answer:

I'm not sure how euros work but I'm almost certain there are 18 20p coins

Step-by-step explanation:

Which of the following represents the probability that someone whoworks full time has more than $5,000 in credit card debt?
(A) P(full time and credit card debt over $5,000)
(B) P(full time or credit card debt over $5,000)
(C) P(full time credit card debt over $5,000)
(D) P(credit card debt over $5,000 | full time)
(E) P(full time)*P(credit card debt over $5,000)

Answers

Answer:

The correct option is;

(E) P(full time) × P(credit card debt over $5,000)

Step-by-step explanation:

The given parameters are;

The mode of employment of a person = Full time

The amount of debt in the credit card = More than $5,000

The probability that a person works full time = P(full time)

The probability that the person has over $5,000 in credit card debt = P(credit card debt over $5,000)

Therefore, the probability that someone who works full time has more than $5,000 in credit card debt = P(full time) × P(credit card debt over $5,000)

how do i solve this infinite geometric series?

64/25-16/5+4-5

Answers

$(64)/(25)-(16)/(5)+4-5+....\n\na_1=(64)/(25);\ a_2=-(16)/(5)\n\nq=a_2:a_1\n\nq=-(16)/(5):(64)/(25)=-(16)/(5)\cdot(25)/(64)=-(5)/(4)\n\nS_n=(a_1(1-q^n))/(1-q)\n\n\nS_n=((64)/(25)(1-(-(5)/(4))^n))/(1-(-(5)/(4)))=(64)/(25)(1-(-(5)/(4))^n):(1+(5)/(4))=(64)/(25)(1-(-(5)/(4))^n):(9)/(4)\n\n=(64)/(25)(1-(-(5)/(4))^n)\cdot(4)/(9)=(256)/(225)\cdot\left(1-\left(-(5)/(4)\right)^n\right)$

$x= (64)/(25) - (16)/(5) +4-5+...\n \na_1= (64)/(25)\ \ \ \wedge \ \ \ a_2= - (16)/(5)\ \ \ \Rightarrow\ \ \ q= (a_2)/(a_1) = (-16)/(5):(64)/(25)= (-16)/(5)\cdot (25)/(64)=- (5)/(4) \n \nx=sum\ of\ the\ infinite\ geometric\ series\n \n$

$x= \lim_(n \to \infty) a_1\cdot (1-q^n)/(1-q) = \lim_(n \to \infty) (64)/(25) \cdot (1-(- (5)/(4))^n )/(1+ (5)/(4) ) =\n \n= \lim_(n \to \infty) (64)/(25) \cdot (4)/(9) \cdot [1-(- (5)/(4))^n]= (256)/(225) +(256)/(225)\cdot \lim_(n \to \infty) (- (5)/(4) )^n\n \nn=2k\ \ \Rightarrow\ \ \ \lim_(n \to \infty) (- (5)/(4) )^n=+\infty\ \ \Rightarrow\ \ \ x\rightarrow+\infty\n \n$

$n=2k+1\ \ \ \Rightarrow\ \ \ \lim_(n \to \infty) (- (5)/(4) )^n=-\infty\ \ \Rightarrow\ \ \ x \rightarrow -\infty$

8n + 2 = 5n + 11 , does anyone one know the answers

Answers

Answer:

n=3

Step-by-step explanation:

8n + 2 = 5n + 11

Subtract 5n from each side

8n-5n + 2 = 5n-5n + 11

3n+2 = 11

Subtract 2 from each side

3n+2-2 = 11-2

3n = 9

Divide by 3

3n/3 = 9/3

n =3

Answer:

n=3

Step-by-step explanation:

Let's do the algebra step-by-step.

8n+2=5n+11

-2 -2

8n=5n+9

-5n -5n

3n=9

/3 /3

n=3

Hope this helps :D

How many pages does a good resume have

Answers

It is often said that a resume should never exceed on page but that is more of a trend than a rule
a good resume will consist of you strengths and you experience and other things that the person hiring you should know about

But usually resumes are one to two pages

Answer:

its 1 not 2 i picked 2 and got it wrong on penfo

Step-by-step explanation:

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