one of them is called trignometry, one is a protractor and the other is a good question...
If measure angle 3 = x2 + 4x and measure angle 5 = 3x + 72, find the possible measures of angle 3 and angle 5
To determine the measure of angle ( \angle 3 ), we need more context about the relationship between arc ( gbd ) and angle ( \angle 3 ). If ( \angle 3 ) is an inscribed angle that subtends arc ( gbd ), then its measure would be half of the arc's measure. Therefore, if arc ( gbd ) measures 280 degrees, ( \angle 3 ) would measure ( 140 ) degrees.
No cheating!
if angle 1 puls angle 5 ewuals 100 find the measure of angle 3
If lines m and n are parallel and the measure of angle 2 is 45°, then angle 3, which corresponds to angle 2 as an alternate interior angle, will also measure 45°. This is due to the properties of parallel lines, where alternate interior angles are congruent. Therefore, the measure of angle 3 is 45°.
Types of angles according to measure: 1. Acute angle- angle measure is less than 90 degrees 2. Right angle- angle measure is 90 degrees 3. Obtuse angle- angle measure is more than 90 degrees but less than 180 degrees. 4. Straight angle- angle measure is 180 degrees 5. Reflex angle- angle measure is more than 180 degrees but less than 360 degrees
25
40-degrees 140-degrees
The question cannot be answered with no information on what the angles refer to nor what the overall shape is!
1 plus 2 is equal to 3
90 - (2x - 3)
A right angle is 90 degrees so if it was 1/3 the measure of a 90 degree angle it would be 30 degrees.