Question

# if

## The correct answer is:

### Related Questions to study

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In this question, we have to find the general solution of x. Here more than one option will correct. Remember the rules for finding the general solution.

### if

In this question, we have to find the general solution of x. Here more than one option will correct. Remember the rules for finding the general solution.

### Number of ordered pairs (a, x) satisfying the equation is

### Number of ordered pairs (a, x) satisfying the equation is

### The general solution of the equation, is :

### The general solution of the equation, is :

The noble gas used in atomic reactor ,is

The noble gas used in atomic reactor ,is

### Which compound does not give on heating?

### Which compound does not give on heating?

In the interval the equation has

In this question, we have to find type of solution, here, we know if then we can take antilog, b = c^{a}, and cos^{2} θ = 1 – 2 sin^{2} θ . Remember these terms and find the solution easily.

In the interval the equation has

In this question, we have to find type of solution, here, we know if then we can take antilog, b = c^{a}, and cos^{2} θ = 1 – 2 sin^{2} θ . Remember these terms and find the solution easily.

### If ,then

In this question, we have to find the where is θ lies. Here, always true for sinx ≥ 0 otherwise it is true for x=0,,,2π and since we also need x≠, for tanx and x≠0,2π for cotx all the solutions.

### If ,then

In this question, we have to find the where is θ lies. Here, always true for sinx ≥ 0 otherwise it is true for x=0,,,2π and since we also need x≠, for tanx and x≠0,2π for cotx all the solutions.

Number of solutions of the equation in the interval [0, 2] is :

Number of solutions of the equation in the interval [0, 2] is :

### If ,then

In this question, we have given equation, where we have to find where the θ belongs. For all value of sin θ cos θ = so θ always lies between ( 0 , ) .

### If ,then

In this question, we have given equation, where we have to find where the θ belongs. For all value of sin θ cos θ = so θ always lies between ( 0 , ) .

### If

### If

The most general solution of the equations is

The most general solution of the equations is

The general solution of the equation, is

The general solution of the equation, is

The most general solution of cot = and cosec = – 2 is :

In this question, we have given cotθ = -√3 and cosecθ = -2. Where θ for both is -π/6 and then write the general solution.

The most general solution of cot = and cosec = – 2 is :

In this question, we have given cotθ = -√3 and cosecθ = -2. Where θ for both is -π/6 and then write the general solution.