SuicideFuel Problem

[trying to ascend]

Consider two circles in the first quadrant:

• C1 with center (x1, y1), radius r1 and area π/16

• C2 with center (x2, y2), radius r2 and area 144π.

Knowing that (x1, y1, r1) and (x2, y2, r2) are two geometric progressions with sums of the terms equal to 7/4 and 21, respectively, then the distance between the centers of C1 and C2 is equal to

[UWSL][/UWSL]

 

[TheProphetMuscle]

View: https://youtu.be/_FJgcocQ7ng

 

[trying to ascend]

View: https://youtu.be/_FJgcocQ7ng

Do americans really use calculators in tests?

 

[TheProphetMuscle]

Do americans really use calculators in tests?

Depends but usually

 

[HyperVersager_4EVER]

(137^1/2)/2
From A=πr^2 r1 is 1/4 and r2 is 12
x1 = 1, y1 =1/2 and r1 = 1/4 adds up to 7/4
x2 = 3, y2 = 6, r2 = 12 adds up to 21
distance between 1,1/2 and 3,6 is c = (2^2 + (11/2)^2)^1/2
Which is (137^1/2)/2

 

[trying to ascend]

(137^1/2)/2
From A=πr^2 r1 is 1/4 and r2 is 12
x1 = 1, y1 =1/2 and r1 = 1/4 adds up to 7/4
x2 = 3, y2 = 6, r2 = 12 adds up to 21
distance between 1,1/2 and 3,6 is c = (2^2 + (11/2)^2)^1/2
Which is (137^1/2)/2

Correct.

What's your professional/educational background?

 

[HyperVersager_4EVER]

Correct.

What's your professional/educational background?

Total failure in high school
Currently failing the Uni very hard(non-STEM field)
I am solving these HS questions to feel less shit about myself and brush up my math knowledge a bit

 

[trying to ascend]

Total failure in high school
Currently failing the Uni very hard(non-STEM field)
I am solving these HS questions to feel less shit about myself and brush up my math knowledge a bit

Weird, since you seem to math mog most on this forum, even the ones who are in stem related fields.

Here is a challenge for you: Consider the parabola of equation P y = ax², with a > 0 and a point A of coordinates (x0, y0), which satisfies y0 < ax²0. Be S the area of the triangle ATT', where T and T' are contact points between the tangents of P passing through A.

Evaluate the area of the triangle S in function of a, x0 and y0

 

[HyperVersager_4EVER]

Weird, since you seem to math mog most of this forum, even the ones who are in stem related fields.

Absolutely positive that any STEMcel would mathmog me
I guess they are just not interested in doing your homework lol

Here is a challenge for you: Consider the parabola of equation P y = ax², with a > 0 and a point A of coordinates (x0, y0), which satisfies y0 < ax²0. Be S the area of the triangle ATT', where T and T' are contact points between the tangents of P passing through A.

Evaluate the area of the triangle S in function of a, x0 and y0

I barely remember anything about these kinds of graphs
Give me more time and I will try more seriously to answer