The sum of the angles of a triangle are always 180°
The sum of the angles of a triangle are always 180°
Unless there are lines that are not straight in the image (which would make the calculation of x literally impossible), the third angle of the triangle in the left has to be 80°, making the angle to its right to be 100°, making the angle above it to be 45°, making the angle above it to be 135°. This is basic trigonometry.
F*ck you very much for that earworm dude
I just found out that I am actually from Iowa ¯\_(ツ)_/¯
🎶 Everybody 🎶
Well, The show must go on…
Yeah, get some.
In this instance it is kinda appropriate though, since those were fire-arrows…
I’ve heard this in Greece as well.
You need to install Force Stop App(NO ROOT) and run it whenever your phone starts to feel sluggish. Helps a lot!
Ah, there it is.
We will probably be underwater in 2030.
I think that I should become a captain in a supertanker…
And here is an ABSOLUTELY PROPHETIC video about the current situation :-)
But only if you have purple eyes
“- Setting the clock and a timer to record something on your VCR”
You just awakened a sad memory from 30 years ago… I wanted to record a movie I saw in the TV programme magazine but it started after midnight and I should have used the next day’s date :-(
This is some Black Mirror shit right here.
What you say makes no sense.
The problem is LITERALLY unsolvable if we can’t assume that all the lines are straight.
The schematic was OF COURSE purposefully drawn in a way to make the viewer assume that the third angle of the left triangle is 90°, making the angle to it’s right also be 90°, but the point of the exercise is to get the student to use ALL the given information instead of presuming right angles.
And NO, assuming all the lines are straight is NOT unreasonable, it is the only way that the problem could ever possibly have a solution.