Math  /  Trigonometry

QuestionEvaluate cos(ab)\cos (a-b) given that cosa=45\cos a=\frac{4}{5} with 0<a<π20<a<\frac{\pi}{2} and sinb=1517\sin b=-\frac{15}{17} with 3π2<b<2π\frac{3 \pi}{2}<b<2 \pi. cos(ab)=\cos (a-b)= \square

Studdy Solution

STEP 1

What is this asking? We need to find the cosine of the difference of two angles, knowing the cosine of the first angle and the sine of the second angle, along with their quadrants. Watch out! Don't mix up the cosine and sine values, and make sure to account for the correct signs based on the quadrants of the angles.

STEP 2

1. Find sin *a* and cos *b*.
2. Apply the cosine difference formula.

STEP 3

Alright, let's **kick things off** by finding sina\sin{a}!
We know that cosa=45\cos{a} = \frac{4}{5} and *a* is in the **first quadrant** (between 00 and π2\frac{\pi}{2}).
In this quadrant, both sine and cosine are **positive**!

STEP 4

Remember the **Pythagorean identity**: (sina)2+(cosa)2=1(\sin{a})^2 + (\cos{a})^2 = 1.
Let's plug in our known value: (sina)2+(45)2=1(\sin{a})^2 + (\frac{4}{5})^2 = 1.

STEP 5

This simplifies to (sina)2+1625=1(\sin{a})^2 + \frac{16}{25} = 1.
Subtracting 1625\frac{16}{25} from both sides gives us (sina)2=11625=25251625=925(\sin{a})^2 = 1 - \frac{16}{25} = \frac{25}{25} - \frac{16}{25} = \frac{9}{25}.

STEP 6

Taking the **square root** of both sides, we get sina=±35\sin{a} = \pm\frac{3}{5}.
Since *a* is in the **first quadrant**, sina\sin{a} is **positive**, so sina=35\sin{a} = \frac{3}{5}.
Awesome!

STEP 7

Now, let's find cosb\cos{b}.
We know sinb=1517\sin{b} = -\frac{15}{17} and *b* is in the **fourth quadrant** (between 3π2\frac{3\pi}{2} and 2π2\pi).
Cosine is **positive** in the fourth quadrant!

STEP 8

Using the **Pythagorean identity** again: (sinb)2+(cosb)2=1(\sin{b})^2 + (\cos{b})^2 = 1, we substitute the known value: (1517)2+(cosb)2=1(-\frac{15}{17})^2 + (\cos{b})^2 = 1.

STEP 9

This simplifies to 225289+(cosb)2=1\frac{225}{289} + (\cos{b})^2 = 1.
Subtracting 225289\frac{225}{289} from both sides, we get (cosb)2=1225289=289289225289=64289(\cos{b})^2 = 1 - \frac{225}{289} = \frac{289}{289} - \frac{225}{289} = \frac{64}{289}.

STEP 10

Taking the **square root** gives us cosb=±817\cos{b} = \pm\frac{8}{17}.
Since *b* is in the **fourth quadrant**, cosb\cos{b} is **positive**, so cosb=817\cos{b} = \frac{8}{17}.
Fantastic!

STEP 11

The **cosine difference formula** is cos(ab)=cosacosb+sinasinb\cos(a-b) = \cos{a}\cos{b} + \sin{a}\sin{b}.
Let's **plug in** our values: cos(ab)=(45)(817)+(35)(1517)\cos(a-b) = (\frac{4}{5})(\frac{8}{17}) + (\frac{3}{5})(-\frac{15}{17}).

STEP 12

Multiplying the fractions, we get cos(ab)=32854585\cos(a-b) = \frac{32}{85} - \frac{45}{85}.

STEP 13

Finally, subtracting the fractions gives us our **final result**: cos(ab)=1385\cos(a-b) = -\frac{13}{85}.
Boom!

STEP 14

cos(ab)=1385\cos(a-b) = -\frac{13}{85}

Was this helpful?

Studdy solves anything!

banner

Start learning now

Download Studdy AI Tutor now. Learn with ease and get all help you need to be successful at school.

ParentsInfluencer programContactPolicyTerms
TwitterInstagramFacebookTikTokDiscord