Great job, geno!!!
in triangle ABC, AB = AC and D is a point on line AC so that line BD bisects angle ABC. if BD = BC what is the measure, in degrees, of angle A?
Let 1/2 of ∠ABC be an x
Hint: The sum of angles in a triangle BCD is 5x, and ∠A = x
That can be done this way: multiply decimal number by a whole number in order to get a whole number as a product.
( Hope it's understandable. English is my second language.)
9.428571429 * 5 = no
9.428571429 * 6 = no
9.428571429 * 7 = 66
Maybe there's some more "mathematical" way to do that.
Hello, ilorty! Thanks for defending me so zealously!!!
I'm that Guest above your post; number in red is wrong! I copied it off Noori's post.
(btw, Dragan is a common male name in my homeland. People often confuse my name with dragon)
***Arc SR is not 106º *** it's 117.52º ( you don't need it, anyway)
Since the points S, T, and R are tangent points, we have:
ET = SE = 26 | SD = DR = 32 | RC = TC = 48
( 26 + 32 + 48 ) * 2 = Perimeter
Hint: triangle PSU is an equilateral triangle.
Use the law of cosines to calculate the angels.
a2 = b2 + c2 −2bc * cos(A)
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Example:
Triangle ABC has sides: a=2, b=3, c=4
22 = 32 + 42 - 2*3*4*cos(A)
cos(A) = 32 + 42 - 22/ 2*3*4 = 0.875
Angle A = 28.955º
This is how that inscribed triangle actually looks.
Scale 1:1
1) In the diagram, angle U = 30 degrees. Arc XY is 170 degrees, and arc VW is 110 degrees. Find arc WY, in degrees.
Hint: line segment VY is a diameter of a circle; the sum of arc VX and arc WY is 80 degrees.
∠U = 1/2 ( arcWY - arcVX )
Arc WY - Arc XV = Angle U = 30 degrees.
Arc WY + Arx XV = 360 - 170 - 110 = 80 degrees.
Therefore, arc WY = (30 + 80)/2 = 55 degrees.
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This is the answer to question #1 from that link; the answer is not correct!!!
