Math

Question Find an equation with solution n=5n=5 using multiplication. Select all correct answers.
4=20n4=\frac{20}{n} 2(n+1)=102(n+1)=10 36=8n36=8 n 7n=287 n=28 4=4n4=4 n 36=9n36=9 n

Studdy Solution

STEP 1

Assumptions
1. We are looking for an equation that has a solution of n=4n=4.
2. We will use multiplication in the equation.
3. The variable to be used in the equation is nn.

STEP 2

We will test each given equation by substituting n=4n=4 and checking if the equation holds true.

STEP 3

Test the first equation:
4=20n4 = \frac{20}{n}
Substitute n=4n=4:
4=2044 = \frac{20}{4}

STEP 4

Calculate the right-hand side:
4=204=54 = \frac{20}{4} = 5
Since 454 \neq 5, the first equation does not have a solution of n=4n=4.

STEP 5

Test the second equation:
2(n+1)=102(n+1) = 10
Substitute n=4n=4:
2(4+1)=102(4+1) = 10

STEP 6

Calculate the left-hand side:
2(4+1)=25=102(4+1) = 2 \cdot 5 = 10
Since 10=1010 = 10, the second equation has a solution of n=4n=4.

STEP 7

Test the third equation:
36=8n36 = 8n
Substitute n=4n=4:
36=8436 = 8 \cdot 4

STEP 8

Calculate the right-hand side:
36=84=3236 = 8 \cdot 4 = 32
Since 363236 \neq 32, the third equation does not have a solution of n=4n=4.

STEP 9

Test the fourth equation:
7n=287n = 28
Substitute n=4n=4:
74=287 \cdot 4 = 28

STEP 10

Calculate the left-hand side:
74=287 \cdot 4 = 28
Since 28=2828 = 28, the fourth equation has a solution of n=4n=4.

STEP 11

Test the fifth equation:
4=4n4 = 4n
Substitute n=4n=4:
4=444 = 4 \cdot 4

STEP 12

Calculate the right-hand side:
4=44=164 = 4 \cdot 4 = 16
Since 4164 \neq 16, the fifth equation does not have a solution of n=4n=4.

STEP 13

Test the sixth equation:
36=9n36 = 9n
Substitute n=4n=4:
36=9436 = 9 \cdot 4

STEP 14

Calculate the right-hand side:
36=94=3636 = 9 \cdot 4 = 36
Since 36=3636 = 36, the sixth equation has a solution of n=4n=4.

STEP 15

The correct equations that have a solution of n=4n=4 are:
2(n+1)=102(n+1) = 10 7n=287n = 28 36=9n36 = 9n

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