HARD
Earn 100

Find the general solution of the following:
(viii) $\tan \theta+\cot \theta=2$
Important Questions on General Solution of Trigonometric Equations
HARD
The number of principal solutions of is:

HARD
If then the value of is

MEDIUM
The number of values of in for which , is :

MEDIUM
Let be three non-zero real numbers such that the equation has two distinct real roots and with . Then, the value of is

HARD
The angles of a triangle satisfy the equations . Then angle equals

HARD
Let The number of elements in is

HARD
The number of for which is:

HARD
One of the solutions of the equation lies in the interval

HARD
The number of real solutions of the equation which lie in the interval is

HARD
If sum of all the solutions of the equation in is , then is equal to:

MEDIUM
The sum of all values of satisfying is

HARD
If then the number of real values of which satisfy the equation is

EASY
The number of solutions to the equation in the interval is

HARD
For the equation has

MEDIUM
Let Then the sum of the elements of is:

MEDIUM
If and are the minimum and the maximum values of then is equal to:

EASY
The general solution of for an integer is

EASY
If then the number of values of for which is:

HARD
Let . The sum of all distinct solutions of the equation in the set is equal to

