Question: Find the greatest value of \(f\left( x \right)=\cos \left( x{{e}^{\left[ x \right]}}+7{{x}^{2}}-3x \...

Question

Find the greatest value of $f\left( x \right)=\cos \left( x{{e}^{\left[ x \right]}}+7{{x}^{2}}-3x \right)$ , $x\in [-1,\infty )$
A. -1
B. 1
C. 0
D. none of these

Answer 1

Solution

We first try to define the domain of the given trigonometric function. Then we state the range of the function for any values of t, $\cos t\in \left[ -1,1 \right]$ . We also try to get one continuous domain of $2\pi$ distance. At the end we find one-point x for which it attains the maximum value.

Complete step by step answer:
The main function of the given $f\left( x \right)=\cos \left( x{{e}^{\left[ x \right]}}+7{{x}^{2}}-3x \right)$ is $\cos$ function.
Now in a span of $2\pi$ , it will take values of $\left[ -1,1 \right]$ . Also, for any values of t, $\cos t\in \left[ -1,1 \right]$ .
We just have to check that we can get a continuous domain of $2\pi$ distance.
Now we find a range of $x{{e}^{\left[ x \right]}}+7{{x}^{2}}-3x$ . Here $\left[ x \right]$ is the greatest integer function which means the output is the greatest integer possible less than x.
As $x\in [-1,\infty )$ , we can say $\left[ x \right]\in [-1,\infty )$ with only integer values.
We also know for any value of x; the exponential function always gets only positive value.
So, $x\in [-1,\infty )$ , we can say ${{e}^{\left[ x \right]}}\in [\dfrac{1}{e},\infty )$ .
So, we can see the function attains at least one continuous domain of $2\pi$ distance as it goes towards infinity.
So, we can say the greatest value of $f\left( x \right)=\cos \left( x{{e}^{\left[ x \right]}}+7{{x}^{2}}-3x \right)$ is 1.
We can also prove it by just showing 1 value of x for which $f\left( x \right)=\cos \left( x{{e}^{\left[ x \right]}}+7{{x}^{2}}-3x \right)=1$ .
Let’s take $x=0$ .
We find the value of $x{{e}^{\left[ x \right]}}+7{{x}^{2}}-3x$ . So, $x{{e}^{\left[ x \right]}}+7{{x}^{2}}-3x=0$ .
So, at $x=0$ , $\cos 0=1$ . We already got a point.

So, the correct answer is “Option B”.

Note: We need to always shoe at least one point which attains the maximum point. As the part $x{{e}^{\left[ x \right]}}$ can have some fixed points due to the factor that ${{e}^{\left[ x \right]}}$ attains only integer value. We have to show that at least one point of x satisfies the equation.