The perpendicular bisector \overline{AB} in the right triangle \triangle ABC

podnescijy

podnescijy

Answered question

2021-11-25

The perpendicular bisector AB in the right triangle ABC forms the triangle with the area 3 times smaller than the area of ABC. Find the measures of acute angles in ABC

Answer & Explanation

Supoilign1964

Supoilign1964

Beginner2021-11-26Added 19 answers

Step 1
The Sides of AB and AC have unit length
Hence, ABC is isosceles with Congruent angles B and C NSNK Since m(A) is given as 60 this means that,
m(B)+m(C)=120
and so, m(B)+m(C)=60
Therefore ABC is equilateral
Equilateral triangles have three lines of reflective symmetry in which the lines joining each vertex to the midpoint of the opposite side.
This means that CD is a line of symmetry for ABC and so CD is perpendicular to AB.
Step 2
By applying Pythagorean Theorem to the right triangle ADC
|AD|2+|CD|2=|AC|2
We Know that D is the midpoint of AB.
B is on the unit circle,
Hence |AB|=1 and |AD|=12
Since C is unit circle, We have |AC|=1
Plugging the values for |AD| and |AC| into the formula gives,
|CD|=32. Since CD is perpendicular to AB .
Therefore, C(12, 32)
sin60=32 and cos60=12

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