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29 votes
29 votes
What's the answer to this question? 4*(5t+1)/5

User Luis Vargas
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2 Answers

8 votes
8 votes

Answer:


4t + (4)/(5)

Explanation:

Step 1: Distribute


(4(5t + 1))/(5)


((4 * 5t) + (4 * 1))/(5)


(20t + 4)/(5)

Step 2: Isolate the numerator into two fractions


(20t +4)/(5)


(20t)/(5) + (4)/(5)


4t + (4)/(5)

Answer:
4t + (4)/(5)

User Vjimw
by
2.6k points
4 votes
4 votes

Answer:


  • \boxed{\sf{4t+(4)/(5) }}

Explanation:

In order to solve this, you must use the distributive property.


\sf{(4\left(5t+1\right))/(5)}

Distributive property:

⇒ A(B+C)=AB+AC


⇒ 4(5t+1)

Multiply by expand.

4*5t=20t

4*1=4

Rewrite the problem down.

20t+4

20t+4/5


\text{FRACTION RULES: }\\\\\\\Longrightarrow: \sf{(A\pm \:B)/(C)=(A)/(C)\pm (A)/(C)}


\Longrightarrow: \sf{(20t+4)/(5)=(20t)/(5)+(4)/(5)}

You have to divide the numbers from left to right.

⇒ 20/5=4


\Longrightarrow: \boxed{\sf{4t+(4)/(5) }}

  • Therefore, the correct answer is 4t+4/5.
User Edward Thomson
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2.8k points