A Very Nice Geometry Problem | You should be able to solve this!

@3:13 finding the radius is easier if we connect C and B ( thriangle is straight) and use Pyphagoras: 4R^2=R^2+25 3R^2=25 R= 5 sqrt 3/3.

Let O be the center of the circle. Draw BC and radius OC. As A and B are opposite ends of a diameter and C is a point on the circumference, ∠BCA = 90°. As ∠CAB and ∠COB cover the same arc CB but A is on the circumference while O is the center, ∠COB = 2•∠CAB = 2(30°) = 60°. As OC = OB = r and ∠COB = 60°, then ∆COB is an equilateral triangle, ∠BCO = ∠OBC = 60°, and BC = OC = OB = r.
As OA = OC = r, ∆AOC is an isosceles triangle and ∠OCA = ∠CAO = 30°. Draw OD, where D is the point on AC where OD is perpendicular to AC. As AC is a chord and O is the center, sonce OD is perpendicular to AC, it bisects AC and AD = DC = 5/2.
As ∠OCA = ∠CAO = 30°, ∠ODA = ∠CDO = 90°, and OA = OC = r (among other equalities), ∆ODA and ∆CDO are congruent 30-60-90 special right triangles.
cos(30°) = DC/OC
√3/2 = (5/2)/r
√3r = 10/2 = 5
r = 5/√3
sin(30°) = OD/OC
1/2 = OD/(5/√3)
OD = (5/√3)/2 = 5/2√3
The purple shaded area is equal to the sum of the areas of triangle ∆AOC and sector COB.
Purple shaded area:
Aₚ = bh/2 + (θ/360°)πr²
Aₚ = 5(5/2√3)/2 + (60°/360°)π(5/√3)²
Aₚ = 25/4√3 + (π/6)(25/3)
Aₚ = 25√3/12 + 25π/18
Aₚ = (25/6)(√3/2+π/3) ≈ 7.97 sq units

You can find R without using sin. ABC is a 30-60-90 triangle. To get the shorter side, divide 5 by sqrt(3). The diameter ist 3 times the shorter side. The radius is half of two times the shorter side - or 5 over sqrt(3). No sin needed.

Looks like it is something to do because it shows that regardless of angle there is a way to calculate the inscribed triangle and sector. Starting a simple circle theorem and describe the separated triangle and sector because of said circle theorem. I am going to test myself on ALL of the videos that have the title, "You should be able to do this" and make sure that my knowledge of geometry is impeccable.

*We will avoid Pythagoras theorem at all* !
Let O is the center of the circle and OC = R (radius)
< OAC=30° => 5=R√3 => *R=5/√3*
and it’s abscess *a₃= R/2*
Now shaded area = area Δ AOC + area (circular sector with center O and arc BC)
= 1/2 λ₃⋅a₃+(πR ²⋅θ°)/360°
= 1/2 R√3⋅R ²+(πR^2⋅60°)/360°
= (R ² √3)/4+(πR²/6)
= R²(√3/4+π/6)
= (25/3)(3√3+2π)/12

Method using Thales theorem, trigonometric ratio, Pythagoras theorem:
1. Let O be centre of circle on diameter AB.
2. Joint BC to form ∆ABC.
∆ABC is right-angled triangle in semicircle. (Thales theorem)
3. In right-angled ∆ABC
BC = AC/tan30 = 5/√3
AB^2 = AC^2 + BC^2 (Pythagoras theorem)
= 5^2 + (5/√3)^2
= 100/3
4. Let R be radius of circle.
R = AB/2 = 5/√3
5. Angle of sector BOC = 30 + 30 = 60 (exterior angle of isosceles ∆AOC)
6. Area of shaded region = area of ∆AOC + area of sector BOC
= (1/2)(R^2)(sin120) + (π)(R^2)(60/360)
= (R^2)[(√3/4) + (π/6)]
= (5/√3)^2[(3√3 + 2π)/12]
= 25 [(3√3 + 2π)/36]

🎉🎉

5 / 2R = cos (30) = sqrt (3)/2 -> 5 = R * sqrt (3) -> R = 5/sqrt (3) _> R^2 = 25/3. Now OC = AO = R -> CAO = ACO = 30 _> COA = 120 -> COB = 60. Now A(purple) = 5*R*sin (30) /2 + Pi * R^2 * 60/360 = 25/sqrt (3)/2 * 1/2 + 25/3 * Pi/6 = (25*sqrt (3) / 12) + (Pi * 25/18) = 7.972

2R = 5 / cos 30° = 10/√3
R = 5/√3 cm
A = A1 + A2 = ½b.h + ½αR²
A = ½.(5/√3)².cos30° + πR²/6
A = 3,6084 + 4,3633
A = 7,97 cm² ( Solved √ )

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5/2r=cos30=√3/2...r/5=1/√3...r=5√3/3... Ayellow=(1/6)πr^2+(1/2)r^2sin120=r^2(π/6+√3/4)

You have uploaded this video minimum 2 times 😂😂😂😂😂

Lei dos Senos, excelente.

(5)^2=25 {25+30°}= 55° 180ABC/55°=3.15ABC 3^1.3^5 1^1.3^5^1 3^1^1 3^1 (ABC ➖ 3ABC+1)

Thales rulez 😂