Write an equation for the two adjacent angles (2 points)

(5x - 25)° + 55° = ?°

(5x - 25)° + 55° = (5x + 30)°

whats the answer

The answer would be (5x + 30)°.

a NUMBER not a equation

If we simplify the equation (5x - 25)° + 55° = (5x + 30)°, we get:

5x - 25 + 55 = 5x + 30

Simplifying further, we have:

5x + 30 = 5x + 30

By subtracting 5x from both sides, we get:

30 = 30

Therefore, the equation is satisfied for any value of x, and there is no specific number that can be determined as the answer.

its not 30

Apologies for the mistake. Let's solve the equation correctly:

(5x - 25)° + 55° = ?°

Combining like terms, we have:

5x - 25 + 55 = 0

Simplifying, we get:

5x + 30 = 0

To isolate x, we subtract 30 from both sides:

5x = -30

Dividing both sides by 5:

x = -6

So, the value of x would be -6.

it was 180 degrees, your wrong

I apologize for the misunderstanding.

We need to find the value of the two adjacent angles when added together, which sums up to 180 degrees.

(5x - 25)° + 55° = 180°

To solve this equation, we need to isolate x.

Subtracting 55 degrees from both sides:

(5x - 25)° = 180° - 55°

Simplifying:

5x - 25 = 125

Adding 25 to both sides:

5x = 150

Dividing both sides by 5:

x = 30

Therefore, the values of the two adjacent angles that would result in summing up to 180 degrees are 30 degrees and 55 degrees.