Question

if cosec theta minus cot theta equal to 1 upon 4 then the value of cos theta + cot theta is​

Answer 1

Answer:

Solution :

Given that

→csc 0 cot 0 = 14 4

we know that

csc²0- theta = 1

x² - y² = (x+y)(x - y)

→ (csc + cot 0) (csc cot0) = 1

-

. csc 0 cot 0 1 4

→ (csc0+ cot 0) × 1 4

csc 0 cot 0 4

Step-by-step explanation:

coseccote 4

Step-by-step explanation:

Given

cos e * c * theta - cot theta = 1/4 - - - (1)

We know the

Trigonometric identity: theta - cot^2 theta = 1

(cos e * c * theta + cot theta)(cos e * c * theta - cot theta) = 1

By algebraic identity:

x ^ 2 - y ^ 2 = (x + y)(x - y)

(cosec0 + cot0) = 1 [from (1)]

coseccoto 4

Therefore,

coseccote 4