How do you solve \[{\sec ^2}x - 2 = 0\]?
Answer
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Hint:
In the given question, we have been given a quadratic, binomial equation. We have to solve for the value of the given variable. This variable here is of the form of a trigonometric function. We solve it by taking the other term to the other side (its sign changes), taking the square root on both sides, then using the standard value table to find the value of the angle.
Complete step by step solution:
We have to solve \[{\sec ^2}x - 2 = 0\].
Taking the constant \[2\] to the other side,
\[{\sec ^2}x = 2\]
Taking square root on both sides,
\[\sec x = \pm \sqrt 2 \]
Now, we know, \[\sec \left( { \pm \dfrac{\pi }{3}} \right) = \pm \sqrt 2 \] and the periodicity of the secant function is of \[\pi \], hence,
\[x = n\pi \pm \dfrac{\pi }{3}\]
Note:
In the given question, we were given a quadratic equation which was a binomial – that is, it has two terms. We solved it by keeping the variable term on one side and the remaining term on the other side. Then we took the square root so that we can have the primitive form of the variable. Then we solved for the argument of the function and got our answer.
In the given question, we have been given a quadratic, binomial equation. We have to solve for the value of the given variable. This variable here is of the form of a trigonometric function. We solve it by taking the other term to the other side (its sign changes), taking the square root on both sides, then using the standard value table to find the value of the angle.
Complete step by step solution:
We have to solve \[{\sec ^2}x - 2 = 0\].
Taking the constant \[2\] to the other side,
\[{\sec ^2}x = 2\]
Taking square root on both sides,
\[\sec x = \pm \sqrt 2 \]
Now, we know, \[\sec \left( { \pm \dfrac{\pi }{3}} \right) = \pm \sqrt 2 \] and the periodicity of the secant function is of \[\pi \], hence,
\[x = n\pi \pm \dfrac{\pi }{3}\]
Note:
In the given question, we were given a quadratic equation which was a binomial – that is, it has two terms. We solved it by keeping the variable term on one side and the remaining term on the other side. Then we took the square root so that we can have the primitive form of the variable. Then we solved for the argument of the function and got our answer.
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