A 180° angle (straight line) is formed by two adjacent angles. One angle has a measure of (2x+3)° and the other has a measure of (x−6)°. What are the measures of the two angles that make up the straight line?(1 point)

To find the measures of the two angles that make up the straight line, we need to set up the equation 2x+3 + x-6 = 180 and solve for x.

Combining like terms, we get 3x - 3 = 180.

Adding 3 to both sides, we get 3x = 183.

Dividing both sides by 3, we get x = 61.

Substituting x back into the expressions for the angles, we find that the two angles are (2(61)+3)° = 125° and (61-6)° = 55°.

Therefore, the measures of the two angles that make up the straight line are 125° and 55°.

The correct answer is option: 125° and 55°

An obtuse angle is formed by two adjacent angles with measures (x−5)° and (3x)°. If the resulting angle measure is 107°, what is the angle measure of each of the two unknown angles? Round to the nearest whole number.(1 point)
Responses

20° and 87°

23° and 84°

32° and 75°

28° and 79°

To find the angle measures, we need to set up the equation (x-5) + (3x) = 107 and solve for x.

Combining like terms, we get 4x - 5 = 107.

Adding 5 to both sides, we get 4x = 112.

Dividing both sides by 4, we get x = 28.

Substituting x back into the expressions for the angles, we find that the two angles are (28-5)° = 23° and (3(28))° = 84°.

Therefore, the angle measures of the two unknown angles are 23° and 84°.

The correct answer is option: 23° and 84°