Math, asked by pdhanushpaladi363, 6 months ago

12
If cos A = cos B = - 1/2 does not lie in the second quadrant and B does not lie in third quadrant ,then find the value of 4sin B-3 tan A /tanB+sinA.

Answers

Answered by thriveda

Answer:

example u write properly

Step-by-step explanation:

We know that cosine function is negative in second quadrant and third quadrant, so if A does not lie in 2nd quadrant, it must i.e. in 3rd quadrant $$ if B does not lie 3rd quadrant, it must lie in 2nd quadrant now, we have

cosA=−

2

1 cosA=−cos

3 π

⇒cos(π+

3 π

)

cosA=cos(

3 4π

)

A=

3 4π

Similarly,

cosB=−

2

1 cosB=−cos

3 π

⇒cos(π−

3 π

)

cosB=cos(

3 2π

)

B=

3 2π

Therefore,

sinA=sin

3 4π

=−

2

3 tanA=tan

3 4π

=

3 sinB=sin

3 2π

=

2

3 tanB=tan

3 2π

=−

3 Since,

tanB+sinA

4sinB−3tanA

=

−

3 −

2

3 4×

2

3 −3×

3 =

−

2

3

2

3 −3

3 =

−

2

3 −

3 =

3

2 Hence, the value is

3

2 . please mark me branlist

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12If cos A = cos B = - 1/2 does not lie in the second quadrant and B does not lie in third quadrant ,then find the value of 4sin B-3 tan A /tanB+sinA.​

Answers

example u write properly

We know that cosine function is negative in second quadrant and third quadrant, so if A does not lie in 2nd quadrant, it must i.e. in 3rd quadrant $$ if B does not lie 3rd quadrant, it must lie in 2nd quadrant now, we have

cosA=−

2

1

cosA=−cos

3

π

⇒cos(π+

3

π

)

cosA=cos(

3

4π

)

A=

3

4π

Similarly,

cosB=−

2

1

cosB=−cos

3

π

⇒cos(π−

3

π

)

cosB=cos(

3

2π

)

B=

3

2π

Therefore,

sinA=sin

3

4π

=−

2

3

tanA=tan

3

4π

=

3

sinB=sin

3

2π

=

2

3

tanB=tan

3

2π

=−

3

Since,

tanB+sinA

4sinB−3tanA

=

−

3

−

2

3

4×

2

3

−3×

3

=

−

2

3

12
If cos A = cos B = - 1/2 does not lie in the second quadrant and B does not lie in third quadrant ,then find the value of 4sin B-3 tan A /tanB+sinA.