How long until unisex multi-stall bathrooms are common at United States universities?

>you could easily solve the problem
run the math again
the shape is impossible. Someone jotted down random numbers and made a shape that couldn't exist

But that's wrong! You're as wrong as the guy that said 80 units!
>protip: not drawn to scale

you're mom is not drawn to scale

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THIS IS POSTED VERY REGULARLY

INANE QUESTION + COMMON CORE IMAGE.

but user, university campuses are the epicenter of rape culture with 7 out of ever 4 women being raped!

The shape is 70 square units

5 x 14 = 70

if you swing the left triangle over to the right to make a rectangle it becomes a 5 x 14 rectangle

you are adding extra length to the rectangle by doing 5 x 16

Yes but trannies are peaceful people! They would never rape anyone!
No you retard, 70 and 80 are both wrong

what is it if not 70?

it makes a perfect rectangle 5 x 14 = 70

explain how this is not the right answer, pro tip you can't

The answer is 91.25. You're all retarded.

70 and 80 and two of infinity correct answers. Therefore, 70 is not "the" right answer. Prove me wrong, protip: you can't. And no it doesn't make a perfect rectangle you fucktarded fucktard, what part of NOT DRAWN TO SCALE do you not fucking understand?
The lower limit of all possible areas of the shape approaches A=sqrt(1008)=31.749015733 from above. The upper limit of all possible areas of the shape is A=40+sqrt[((20+sqrt(25+(16-sqrt39)^2))/2)(((20+sqrt(25+(16-sqrt39)^2))/2)-(sqrt(25+(16-sqrt39)^2)))(((20+sqrt(25+(16-sqrt39)^2))/2)-12)(((20+sqrt(25+(16-sqrt39)^2))/2)-8)]=82.684891941.
Prove that wrong, protip: you can't (and yes the decimal numbers are approximations not exact answers, the non-decimal numbers are exact though)

Nope you're even more retarded than tha 70 and 80 retards because unlike 70 and 80, 91.25 does not even fall within the range of possible areas. Alch yourself.

this shape cannot exist.

from the Pytaghorean theorem, CA = BD = sqrt(39) > 6
now because AB is parallel to the top edge AB = 12

therefore CD = CA + AB + BD > 16

>american education

Area of triangle = (1/2) * (bh)

5^2 + b^2 = 8^2
b=6.25

(1/2) * (6.25*5) = 15.625 (2)

Square:
b*h

5*12 = 60

60 + 15.625 + 15.625 = 91.25

Ok I see what you mean with the triangles

5^2 + 2^2 =/= 8^2

so really they should not have even included the 8's on the sides, the question itself is fucked up

but if you ignore the 8's then the answer is 70

>not realizing I'm right
>br education
>cannot exist
>Israeli education
>91.25
>clapistani education

Let me lay it out REALLY FUCKING CLEARLY for you incompetent fucktards.
We have a quadrilateral with sides 8, 12, 8, and 16; with the 8 sides being opposite each other; with it being possible to draw a line segment of length 5 from one of the angles adjacent to the 12 side to some point along the 16 side.
This is ALL WE FUCKING KNOW. Not enough information for a single solution, but we can get a range of solutions.

The lower limit to all possible solutions occurs when the angle between the left 8 line and the 16 line approaches 0. In this situation, the 5-unit line segment can be ignored. We therefore essentially turn the quadrilateral into a triangle of sides 12, 8, and 8. We can solve this with Heron's formula.
A=sqrt[s(s-a)(s-b)(s-c)]
s=(a+b+c)/2
s=14
a=sqrt(14*2*6*6)=sqrt(1008)=31.749015733
Since we are making the angle approach 0 rather than be equal to 0, the area is not technically equal to sqrt(1008), rather it approaches sqrt(1008) from above.

The upper limit occurs when the intersection of the 12 line and the left 8 line are as far from the 16 line as possible. Therefore we have a right triangle with sides 8, 5, and sqrt39 along with a quadrilateral with sides 5, 12, 8, and 16-sqrt39 where the sides of length 5 and 16-sqrt39 form a right angle. We can split the quadrilateral into two triangles, drawing a line segment from the upper left corner to the lower right corner.
By combining the lower left of these two triangles with the triangle we initially separated, we have a single triangle of base 16 and height 5, giving us an area of 40.
We are now left with one triangle of area 40 and one triangle with a side length of 12 and a side length of 8. In order to solve the area of the latter triangle, we need to determine either the remaining side or an angle. We cannot solve for any of the angles without first solving for the remaining side, so we'll just solve for the remaining side. To do this, we need to take the right triangle that we created in the middle of the figure whose hypotenuse is the same as the unknown side on the triangle we still have to solve. Given that we know the other two sides are 5 and 16-sqrt39, we can use the Pythagorean Theorem to determine the length of the hypotenuse as sqrt(25+(16-sqrt39)^2). We now have all three side lengths for the triangle of unknown area and can use Heron's formula to solve.
a=sqrt(25+(16-sqrt39)^2)
b=12
c=8
A=sqrt(s(s-a)(s-b)(s-c))
s=(a+b+c)/2
s=(20+sqrt(25+(16-sqrt39)^2))/2
A=sqrt[((20+sqrt(25+(16-sqrt39)^2))/2)(((20+sqrt(25+(16-sqrt39)^2))/2)-(sqrt(25+(16-sqrt39)^2)))(((20+sqrt(25+(16-sqrt39)^2))/2)-12)(((20+sqrt(25+(16-sqrt39)^2))/2)-8)]=42.684891941
Now add to the triangle of area 40 to obtain the area of the quadrilateral.
A=40+sqrt[((20+sqrt(25+(16-sqrt39)^2))/2)(((20+sqrt(25+(16-sqrt39)^2))/2)-(sqrt(25+(16-sqrt39)^2)))(((20+sqrt(25+(16-sqrt39)^2))/2)-12)(((20+sqrt(25+(16-sqrt39)^2))/2)-8)]=82.684891941.

Why do you feel compelled to arbitrarily ignore the 8s when you could just as easily ignore the 5, the 12, or the 16 (and any of those would be ignoring only one measurement, not two) and to assume that the shape is a trapezium when it is not stated to be one, you incompetent fucktard?

yah but if the base of each triangle is 6.25 the the bottom length would have to be 12 + 6.25 + 6.25 = 24.5

but they give a length of 16, so the shape is messed up look at the jew he has the answer

Americans getting a better education from Sup Forums than their high schools.

The kike has the wrong answer dumbass

Except the kike is wrong and is teaching the clapistani nothing.

Nope, the jew is correct. It's called Pythagoras theorem. That shape with those measurements cannot exist.

I'm guessing that in america you don't learn trigonometry until college.

Hold on are we assuming that the two triangles on the left and right form 90 degree angles at the base or not?

if they "do" then this shape can't exist with the given measurements

I'm thinking that this question is messed up

if the triangles are right triangles then the base of the object should be 24.5 units long not 16

see here

>Pythagoras theorem
I think the term you're looking for is 'Pythagorean Theorem', dumbfuck. And the Pythagorean Theorem is irrelevant to this problem.
>That shape with those measurements cannot exist.
Wrong. Pic related are the limits and and for an explanation.
>I'm guessing that in america you don't learn trigonometry until college.
Some people don't. I learned it during summer between 9th and 10th grade, then calculus during 10th grade.

>Hold on are we assuming that the two triangles on the left and right form 90 degree angles at the base or not?
Does the problem say they form 90 degree angles? No? Then fuck yourself with your unfounded assumptions, faggot. And by the way, I only see one triangle in that picture, not two.

The jew is right and the triangle is wrong. If the hypotenuse is 8 the catheti can't be 2 and 5.

>The jew is right
Nope
>and the triangle is wrong.
Nope
>If the hypotenuse is 8 the catheti can't be 2 and 5.
What the fuck are catheti?

70?

>The jew is right
Never thought I'd type these words...

It's called Pythagoras' theorem as well burger boy.

You left out the apostrophe though you fucktard.

Just from looking at the shape, would the area of the right one increase if you moved the 8 line so it is vertical?

Catheti(plural of cathetus) are the sides of a right triangle that aren't the hypotenuse. According to Pythagoras' equation the triangle is impossible. If the hypotenuse is 8 (whatever units) and one cathetus is 5 (units) long, the other cathetus can't be 16-12/2=2 long. In fact, it should be about 6,25 if we assume the triangles in the pic are equal in size.

>one triangle in that picture, not two.
one triangle on the left and one on the right

OK, if the triangles do not form a right angle then what is even the point of the measurement at all? we know that the base must be 16 and the 5 line could meet at any arbitrary point along the 16 line

simple answer is they fucked up the question by including the 8's on the side without them the answer is simply 70, with them we get an impossible shape

probably some idiot test maker thought "Hey those two sides ought to have measurements, I'll just throw an 8 on there"

But they did not realize that it messes up the whole shape

I can honestly tell you that the SAT and ACT standardized tests have a few math problems where the figure purposely isn't drawn to scale. They still want you to solve the problem based upon the numbers provided (I took my tests in 07 and 08). Trigonometry for me was bundled with geometry and pre-calculus. I took first semester calculus (AP calculus AB) as my year long senior math class. A smaller amount of seniors in my class, (maybe 25 students) were taking AP calculus BC, second semester college calculus.

I don't wanna provide my input on solving the problem though because it looks like I have gotten really rusty on trig. Still good with calculus even though I only do biology graduate coursework.