Find the area of the given triangle to the nearest square unit. Angle a= 30 degrees, b=10, angle B=45 degrees

Question

asked Nov 20, 2020 198k views

1 Answer

Fernando Mazzon · Answer 1 · 2020-11-25T11:29:12+0000

Answer:

$A=34\ units^2$

Explanation:

Suppose we have a general triangle like the one shown in the figure.

We know the angle A, the angle B and the length b.

$A = 30\°\\\\B = 45\°\\\\b = 10$

By definition I know that the sum of the internal angles of a triangle is always equal to 180 °.

So

$A + B + C = 180\\\\30 + 45 + C = 180$

We solve the equation and thus we find the angle C.

$C = 180 - 30-45\\\\C = 105$

We already know the three triangle angles.

Now we use the sine theorem to calculate the sides c and a.

The sine theorem says that:

(sin(A))/(a)=(sin(B))/(b)=(sin(C))/(c)

Then

(sin(30))/(a)=(sin(45))/(10)

(sin(30))/((sin(45))/(10))=a

a=7.071

Also

(sin(105))/(c)=(sin(45))/(10)

(sin(105))/((sin(45))/(10))=c

c=13.660

Finally, we use the Heron formula to calculate the triangle area

A=√(s(s-a)(s-b)(s-c))

Where s is:

s=(a+b+c)/(2)

Therefore

s=(7.071+10+13.660)/(2)

s=15.37

A=√(15.37(15.37-7.071)(15.37-10)(15.37-13.66))

$A=34\ units^2$