Law of Sines and Cosines
Law of Sines and Cosines
Basic trigonometry (SOH CAH TOA) is perfect for right triangles, but what happens when a triangle doesn't have a 90โ angle? To solve non-right (oblique) triangles, we use the Law of Sines and the Law of Cosines. These laws allow you to find missing sides and angles in any triangle.
The Law of Sines
The Law of Sines states that the ratio of a side's length to the sine of its opposite angle is constant for all three sides of a triangle.
sinAaโ=sinBbโ=sinCcโ
When to use it: You use the Law of Sines when you know two angles and one side (AAS or ASA), or two sides and a non-included angle (SSA).
Example: In โณABC, a=8, โ A=30โ, and โ B=45โ. Find b.
Solution: Set up the ratio using the Law of Sines: sin30โ8โ=sin45โbโ
Multiply both sides by sin45โ to isolate b: b=sin30โ8sin45โโ
Substitute the known sine values: b=21โ8(22โโ)โ=82โ
The Law of Cosines
The Law of Cosines generalizes the Pythagorean theorem for all triangles. It relates all three sides of a triangle to the cosine of one of its angles.
c2=a2+b2โ2abcosC
You can rewrite this formula for any angle:
- a2=b2+c2โ2bccosA
- b2=a2+c2โ2accosB
When to use it: You use the Law of Cosines when you know two sides and the included angle (SAS), or when you know all three sides (SSS).
Example: In โณABC, a=7, b=10, and โ C=40โ. Find c.
Solution: Since we know two sides and the included angle, we use the Law of Cosines: c2=72+102โ2(7)(10)cos40โ c2=49+100โ140(0.7660) c2=149โ107.24=41.76 cโ41.76โโ6.46
Area of a Triangle Using Sine
You can also use trigonometry to find the area of any triangle if you know two sides and the included angle (SAS). The formula is:
Area=21โabsinC
This formula works for any combination of sides and their included angle (e.g., 21โbcsinA or 21โacsinB). It is incredibly useful because you don't need to know the height of the triangle!