Find the Measure of the EXTERIOR ANGLE | Triangle Exterior Angle Theorem | Geometry
HTML-код
- Опубликовано: 7 авг 2024
- Here is a video tutorial on how to find the measure of the exterior angle of a triangle. We will go through 5 different examples together, where each problem gets a little bit harder. You will learn how to apply the Exterior Angle Theorem for a triangle, either to find the exterior angle itself or the value of x.
Timestamps:
00:00 - Intro
00:08 - Problem 1
02:04 - Problem 2
03:00 - Problem 3
03:59 - Problem 4
05:55 - Problem 5
----------------------------------------
Be sure to subscribe for more remote learning and math videos:
/ @yourmathtutorvids
-----------------------------------------
Tags: your math tutor, geometry, exterior angle of a triangle, find the measure of the exterior angle, exterior angle theorem problems, exterior angle theorem tutorial, how to find the exterior angle, exterior angles, exterior angle property, how to find the measure of the exterior angle, triangle exterior angle, exterior angle theorem of triangle, exterior angles find the value of x
Hope this was helpful. Thanks for watching!
It only took 4 minutes to solve 3 questions that just took me 1 hour to figure out and failed. This video just saved another hour of struggle. Big like to this vid.
Yesss I love comments like these! Learning can be super easy and rewarding with the right teacher / materials!
Thank you so much if I hadn't watch your video I wouldn't be able to answer our assignment😊
Just started learning this in class and this vid is so helpful! You teach better then my teacher.
Thank you for the compliment!! So glad it helped
Powerful tutor
Thank you :)
Thank you teacher
It was much easier when i got to learn it this way ty this made me better in my studies 😊😊
That’s great! I tried to make my videos in the way that it makes the most sense in my brain. Glad it makes sense for you also!
Dear mam,
In Problem 4 we could just--
Add X° (20) with 90°=110°
Thank you madam. This video helped for my studies lot !
Thanks helped me out a lot!!
That’s awesome! Glad the video helped 💪
Great😊
Amazing ! saved my time whilst helping my son
That’s great! Good luck to your son!
This is a great example of people are working with nothing but positive numbers. Is there a video that works with subtraction and negative
ty
Glad this helped :)
😢😢😮you saved me😢😢
what do you mean plug in for problem 2?
Apologies for the late response! “Plug in” means “substitute”.
In problem 2, in order to find the value of the exterior angle 3x+5, we have to “plug in” / “substitute” for x. If you substitute x=20 into 3x+5, you get 3(20)+5 which equals 65.
So the exterior angle is 65 degrees
where did you get 130 from in problem five?
I used the exterior angle theorem on the triangle I highlighted in blue. The two interior angles is 90 + 40 which equals the exterior angle 130
Im stuck in one that says -in a triangle with a tail - the exterior is (3x+6) and the interiors are 24 and (2x+18)
Thank u , from Egypt
Hello! If both angles in the interior are not on the same line as the exterior, then you can use the exterior angle theorem from the video. So the equation would be 24 + 2x + 18 = 3x + 6. Then you can solve for x
How did you get 5 and 45 in question 3?
2x+10+3x+5=60 by Exterior Angle Theorem
2x+3x+10+5= 60 Commutative Property of Addition
5x+15=60 addition of like terms
5x+15-15=60-15 additive inverse (added negative 15 to both sides.)
5x=45 simplified by subtraction
x=9 multiplicative inverse (multiplied both sides by 1/5)
Substitute 9 into the givens to determined the angle measures; 28 and 32 degrees respectively.
Cheerful Calculations! 🧮
why did you subtract in question 2?
Hello! I don’t quite understand your question. Where was the subtraction? The only subtraction I did was to simplify the first equation. 45 - 5 = 40 and 3x - x = 2x
simplifying makes it confusing
Hey! Which part is confusing? I can try to explain it
@Huge Teeparty Ahh makes sense. That’s good feedback for future videos. Glad this helped!