Question

4/11=?/121 find unknown values for the following equation

Answer 1

The unknown value = 44

GIVEN:- 4/11=?/121

TO FIND:-?

SOLUTION:-

• In the given equation it is already proved that LHS is equal to RHS.
• By equating both sides we need to find the value of the unknown number.

Let the unknown value be x

According to the question,

$\frac{4}{11} = \frac{x}{121 \\ }$

By cross multiplication

$4 \times 121 = x \times 11 \\ 484 = 11x \\ 11x = 484$

By dividing both sides by 11

$\frac{11x}{11} = \frac{484}{11} \\ x = 44$

LHS = $\frac{4}{11}$

RHS = $\frac{44}{121} = \frac{4}{11}$

RHS = LHS

Hence, the unknown value = 44

#SPJ2

Answer 2

Answer:

The answer to the given question is 44.

Step-by-step explanation:

Given :

4/11=?/121

on writing this exactly, we have

$\frac{4}{11} = \frac{ }{121}$

To find :

we have to find the unknown value

Solution :

In the question, it is already stated that the left-hand side is equal to the right-hand side.

By equalizing both sides we can get the final answer.

Let the unknown value be y.

Both side values are equivalent to each other.

On cross-multiplying, we get the values as

$\frac{4}{11} = \frac{y}{121 }\\ 4 \times 121 = 11y$

The 11 multiplying on the right side divides the values on the left side,

Then on dividing, we get the values as

$\frac{4 \times 121}{11} = y$

The 11 cancels the 121 by 11 times.

The remaining values will be

$(4)(11) = (44)$

The value of y is found to be 44.

As we know that LHS is equivalent to RHS.

then the final answer will be

$\frac{4}{11} = \frac{44}{121}$

on further cancelling, we get the value as

$\frac{4}{11} = \frac{4}{11} = \frac{44}{121}$

Hence, LHS = RHS.

Therefore, the final answer to the given question is 44.

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