Question

If two angles in the form of linear pair and are in the ratio of 2:3, find the angles in degrees.

Answer 1

Answer:

here is your answer

Step-by-step explanation:

HENCE PROVED

Answer 2

Hello buddy

Your step by step explanation with correct answer is mentioned below.

Step-by-step explanation:

If two angles are in linear pair then their sum must equal to 180°

Lets the first angle be 2x & another be 3x

THEN,

$2x + 3x = 180$

$5x = 180$

$x = \frac{180}{5}$

$x = 36$

Now we can simply substitute the value lf x

As we let earlier,

First angle = 2x = 2×36=72°

& Second angle = 3x = 3×36 = 108°

And these are the answers i.e. 72° & 108°

If you have a question that why we take first angle 2x and second angle 3x. We did it because we can take any values of both angles that will give us a ratio 2:3. We know ratio of 2x:3x = 2:3

In place of 2x, we can even take 2x², 2x³,etc & at place of 3x, we can take 3x², 3x³,etc., then we get same result.

For simplicity we take the values 2x &3x

Hope it helps,

And,

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