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
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
40-degrees 140-degrees
25
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.
In a situation involving parallel lines and a transversal, the measure of angle 4 can be determined based on its relationship to other angles formed by the transversal. If angle 4 is an alternate interior angle to another angle (for example, angle 3), then angle 4 will be equal to that angle. If angle 4 is a corresponding angle to another angle (e.g., angle 1), it will also be equal. To find the exact measure, you would need the measure of one of the related angles or additional information.