(1-sin^2 (theta+16^circ))/(cos ec^2(theta+76^circ)-cot^2(theta+76^circ))

Vishal Dev

Vishal Dev

Answered question

2022-08-29

Answer & Explanation

Eliza Beth13

Eliza Beth13

Skilled2023-05-24Added 130 answers

To solve the given expression, let's break it down step by step.
The given expression is:
θ=14
(1sin2(θ+16))csc2(θ+76)cot2(θ+76)+sin(θ+46)tan(θ+16)
Now, let's simplify it one term at a time.
1. Simplifying the first term:
The first term is:
(1sin2(θ+16))csc2(θ+76)cot2(θ+76)
We can use the trigonometric identity sin2(θ)=1cos2(θ) to simplify the numerator:
1sin2(θ+16)=1(1cos2(θ+16))=cos2(θ+16)
Similarly, we can use the trigonometric identity csc(θ)=1sin(θ) and cot(θ)=cos(θ)sin(θ) to simplify the denominator:
csc2(θ+76)cot2(θ+76)=(1sin(θ+76))2(cos(θ+76)sin(θ+76))2
Using the common denominator sin2(θ+76), we can rewrite the denominator as:
(1cos2(θ+76)sin2(θ+76))=sin2(θ+76)cos2(θ+76)sin2(θ+76)
Simplifying the numerator further, we have:
sin2(θ+76)cos2(θ+76)=cos2(θ+76)+sin2(θ+76)
Using the trigonometric identity sin2(θ)cos2(θ)=1, we get:
cos2(θ+76)+sin2(θ+76)=1
Therefore, the first term simplifies to:
cos2(θ+16)1=cos2(θ+16)
2. Simplifying the second term:
The second term is:
sin(θ+46)tan(θ+16)
Using the trigonometric identity tan(θ)=sin(θ)cos(θ), we can rewrite the term as:
sin(θ+46)tan(θ+16)=sin(θ+46)sin(θ+16)cos(θ+16)
3. Combining the terms:
Now, let's substitute the simplified expressions back into the original expression:
(1sin2(θ+16))csc2(θ+76)cot2(θ+76)+sin(θ+46)tan(θ+16)
=cos2(θ+16)+sin(θ+46)sin(θ+16)cos(θ+16)
=cos2(θ+16)+sin(θ+46)sin(θ+16)cos(θ+16)
=cos2(θ+16)+sin(θ+46)sin(θ+16)cos(θ+16)
=cos2(θ+16)+sin(θ+46)sin(θ+16)cos(θ+16)
4. Substituting the value of θ:
Now, we can substitute the value of θ=14 into the expression:
θ=14
=cos2(14+16)+sin(14+46)sin(14+16)cos(14+16)
=cos2(30)+sin(60)sin(30)cos(30)
Using the values of cos(30)=32 and sin(60)=32, we can simplify further:
=(32)2+32·1232
=34+12
=34+24
=14
Therefore, the value of the given expression when θ=14 is 14.
Since none of the given options matches the calculated value, the correct answer is not among the options provided (a), b), c), d)).

Do you have a similar question?

Recalculate according to your conditions!

New Questions in Advanced Math

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?