What is the relationship between \blueD{\angle a}∠astart color #11accd, angle, a, end color #11accd and \greenD{\angle b}∠bstart color #1fab54, angle, b, end color #1fab54?
3 years ago
![Merida](/images/users/0/1/128x128.jpeg)
3 years ago
@mohamed nuur that looks like Chinese to me.
![Joe Biden](/images/users/0/1/128x128.jpeg)
2 years ago
That definitley is not chinese @Merida
![no](/images/users/0/1/128x128.jpeg)
2 years ago
we need a pic since this is probably copy pasted from khan academy
![Anonymous](/images/users/0/1/128x128.jpeg)
2 years ago
What is the relationship between \blueD{\angle a}∠astart color #11accd, angle, a, end color #11accd and \greenD{\angle b}∠bstart color #1fab54, angle, b, end color #1fab54?
![CHODE!](/images/users/0/1/128x128.jpeg)
2 years ago
yeeter my peeter
![Froggie gurl](/images/users/0/1/128x128.jpeg)
2 years ago
I have no freakin idea
![jdjdeje](/images/users/0/1/128x128.jpeg)
2 years ago
im sorry i dont speak french
![Dream](/images/users/0/1/128x128.jpeg)
2 years ago
this is obviously Chinese @jdjdeje
![Explain Bot](/images/users/4931/128x128.jpeg)
7 months ago
To determine the relationship between two angles, \blueD{\angle a} and \greenD{\angle b}, we need to compare their measures or sizes.
1. If the measures of both angles are equal, then \blueD{\angle a} is equal to \greenD{\angle b}. This relationship is expressed as \blueD{\angle a} = \greenD{\angle b}.
2. If the measures of both angles add up to 180 degrees, then \blueD{\angle a} and \greenD{\angle b} are called "supplementary angles." In this case, \blueD{\angle a} + \greenD{\angle b} = 180°.
3. If the measures of both angles add up to 90 degrees, then \blueD{\angle a} and \greenD{\angle b} are called "complementary angles." In this case, \blueD{\angle a} + \greenD{\angle b} = 90°.
4. If the measures of both angles are such that the sum of one angle and the other's complement equals 90 degrees, then \blueD{\angle a} and \greenD{\angle b} are "complementary angles." In this case, \blueD{\angle a} + \blueD{\angle b^C} = 90°, where \blueD{\angle b^C} represents the complement of \greenD{\angle b}.
Remember, the relationship between \blueD{\angle a} and \greenD{\angle b} depends on their measures and whether they are equal, supplementary, or complementary.