Is 1/4 rational or irrational

Answers

Answer 1

Answer: a rational number can be written as a fraction with whole numbers
an irrational cannot be written as a fraction
1/4 is a fraction with whole numbers
(pi is irrational because it never ends and it's fraction form can only be estimated)

1/4 is rational

Answer 2

Answer: Any number that you can completely write down with digits ... and a fraction bar or decimal point if necessary ... is rational. 1/4 is the complete number so it's rational. It's as easy as that.

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a 3-inch candle burns down in 12 hours.Assuming the candles are the same thickness and make (that is, directly proportional),how long would it take for a 1-inch candle to burn down?

Answers

Answer: 4 hours

Step-by-step explanation:

. Solve the equation.
6r = –48
(1 point)
–8
8
–54
–42

Answers

r = -8 because 6 x -8 = -48

What is the numerator when 0.83 is written as a fraction with a denominator of 100?

Answers

Well, if the denominator is 100, then the numerator is obviously 83.

The numerator is 83, the fraction is written 83/100

"I am 3 times as old as Sue is," Frank said to Ann. "On the other hand, I am 15 years older than John while Sue is 1 year younger than John. How old am I?"If J represents John's age, then which of the following equations could be used to solve the problem?

A. 3(J + 15) = J - 1
B. J + 15 = 3J - 1
C. J + 15 = 3(J - 1)

Answers

If J represents John's age, then J + 15 = 3(J - 1) equations could be used to solve the problem

What is Equation?

Two or more expressions with an equal sign is called as Equation.

Given that

"I am 3 times as old as Sue is," Frank said to Ann. "On the other hand, I am 15 years older than John while Sue is 1 year younger than John.

F=Frank

J=John

S=Sue.

I am 15 years older than John

In the sense Frankes age is 15 more than John age, So it is 15+J

Sue is 1 year younger than John.

So Sue's age is less than john

J-1

"I am 3 times as old as Sue is"

Three times of J-1

3(J-1)

So equating this we get

Frank's age is equal to three times Sue's age of John minus one, which is the left-hand side of our equation.

15+J=3(J-1)

Hence 15+J=3(J-1) is the equation could be used to solve the problem.

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Frank = F

Sue = S

John = J

F=3*S

F = J+15

S = J-1

If you want to find Frank's age, then his age would be equivalent to John's plus 15 years.

A.-Would not work because Frank is three times Sue's age, not John's (left hand side of the equation).

B.-Notice that the right hand side of the equation is equivalent to Sue's age, which we know is John-1, however it is currently written to be "three times Sue's age minus one" which would give us John's age, plus two more years than his actual age on the left hand side.

C.-Frank's age is equal to John's plus fifteen (right side of the equation) and Frank is equal to Sue's age times 3. But, if Sue is in terms of Johns, then Sue's age is John's minus one. Therefore, Frank's age is equal to three times Sue's age of John minus one, which is the left-hand side of our equation.

Therefore C is the answer. C:

COMPLETE THE EXERCISE BELOW TO DECOMPOSE 930

Answers

I saw the complete problem:

complete the exercise below to decompose 930

930 = _____ tens = ____ x ____

My answer is:

930 = ninety-three tens or 93 tens = 93 x 10

An election campaign organizer bought 20,000 buttons to hand out for a candidate. The organizer handed out 14,000 of the buttons before receiving the next shipment of 15,500 buttons. On the day of the election, the organizer handed out another 18,250 buttons. How many buttons were left after the election?

Answers

Final answer:

The election campaign organizer started with 20,000 buttons, gave out 14,000, received another 15,500 buttons, and handed out another 18,250. After these transactions, they were left with 3,250 buttons.

Explanation:

To solve this mathematics problem, we need to add the total number of buttons the election campaign organizer had, and then subtract the buttons that were distributed. Initially, the campaign organizer had 20,000 buttons. Out of these, they distributed 14,000, leaving them with 20,000 - 14,000 = 6,000 buttons.

Then, they received a new shipment of 15,500 buttons, increasing their total to 6,000 + 15,500 = 21,500 buttons. On election day, they distributed 18,250 buttons. So, after subtracting this amount, we know that 21,500 - 18,250 = 3,250 buttons were left after the election.

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Answer: 3,250

Step-by-step explanation:

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