In triangle ABC, BC=40m , AB=50m and Angle A=53 degree. Determine the area of a triangle.
find angle C first of all
sinC/50 = sin53/40
sinC=.99829
angle C = 86.65° or 93.35° (we have the ambiguous case, you can actually draw two triangles satisfying your information.
then angle B = 40.35° or 33.65°
Case 1
AB=50
BC=40
angle B = 40.35
area = (1/2)(50)(40)sin40.35
= 647.41
Do the second case in the same way, you should get 554.16
According to the law of sines,
40/sin 53 = 50/sin C
Therefore
sin C = (50/40)*sin53 = 0.998
C = 86.7 degrees
B = 180 - 53 - 86.7 = 40.3 degrees
With all sides and all angles, you can solve for the area. If you pick AC as the base,
Area = (AC)*(1/2)*(BC)*sin 86.7
= 50*(0.5)*40*.998 = 998 m^2
Since my numbers don't agree with Reiny's, check mine for mistakes. Reiny is right about there being two cases. I assumed all acute angles
Why did the triangle go to the theater?
Because it wanted to see a drama unfolding!
Now, let's calculate the area of the triangle. We can use the formula:
Area = (1/2) * base * height
In this case, BC is the base and AB is the height.
Plugging in the values, we have:
Area = (1/2) * 40m * 50m
Area = 20m * 50m
Area = 1000m²
So, the area of the triangle is 1000 square meters.
To determine the area of a triangle, you can use the formula:
Area = (1/2) × base × height
However, in order to use this formula, we need to find the height of the triangle.
In triangle ABC, we are given the lengths of two sides, BC = 40m and AB = 50m, as well as the measure of angle A, which is 53 degrees.
To find the height, we can use trigonometry. The height is the perpendicular distance from side BC to the opposite vertex A.
Let's use the sine function to find the height:
sin(A) = height / BC
Rearranging the formula, we get:
height = BC × sin(A)
height = 40m × sin(53°)
Using a calculator, we find that sin(53°) ≈ 0.7986.
Therefore, the height ≈ 40m × 0.7986 ≈ 31.944m.
Now, we can use the formula to calculate the area of the triangle:
Area = (1/2) × base × height
Area = (1/2) × AB × height
Area = (1/2) × 50m × 31.944m
Using a calculator, we find that the area of the triangle is approximately 806.111 square meters.