Question: Given that \[|\sin 4x + 3|\]. Then what will the maximum and minimum values of the given function re...

Question

Given that $|\sin 4x + 3|$ . Then what will the maximum and minimum values of the given function respectively?
(a) $4,2$
(b) $1,4$
(c) $2,4$
(d) $3,6$

Answer 1

Solution

The given problem revolves around the concepts of trigonometry. So, we will use the condition of existence for the given ‘sine’ term i.e. $- 1 \leqslant \sin z \leqslant + 1$ . Where the ‘sine’ function exists between these values and then adding the $3$ in this entire function the desired solution is obtained.

Complete step-by-step solution:
Since, we have given the function ,
$|\sin x + 3|$ , where mode ‘| |’ sign represents the positive solution of the function because any trigonometric term or any angle cannot be negative, ........................(i)
Now, let us assume that $f(x)$ is functionally active for the given data or say, problem
$\Rightarrow f(x) = |\sin 4x + 3|$
As a result, of the function ‘ $\sin z$ ’ we know that the values exists between $- 1$ and $+ 1$ respectively
(Where, ‘ $z$ ’ is noted as $4x$ implies with the given problem)
Hence, $- 1$ represents ‘minima’ or ‘minimum’ value and $+ 1$ holds the ‘maxima’ or ‘maximum’ value of the function $\sin z$ .......................................… (ii)
Therefore, we can write the above function ' $f(x)$ ’ in the form of
$\Rightarrow - 1 \leqslant \sin z \leqslant + 1$ Or, $= - 1 \leqslant \sin 4x \leqslant + 1$
Or,
$\Rightarrow f(x) = - 1 \leqslant \sin z \leqslant + 1$ Or, $f(x) = - 1 \leqslant \sin 4x \leqslant + 1$
Now, adding $3$ in above function, we get
$\Rightarrow f(x) = ( - 1 + 3) \leqslant |\sin 4x + 3| \leqslant ( + 1 + 3)$ … [From (i)]
Solving the equation systematically, we get
$\Rightarrow f(x) = 2 \leqslant |\sin 4x + 3| \leqslant 4$
From (ii),
$\Rightarrow$ Minima $= 2$ and,
Maxima $= 4$ respectively
$\therefore$ Hence, the option (a) is correct.

Note: One should know the condition of trigonometric terms such as ‘sine’, ‘cosine’, etc. while solving a question (here, we used the condition of ‘sine’ term). We should also know the basic concepts of simplification of the problem studied in earlier classes. As a result, to get the accurate answer we must take care of the calculations so as to be sure of our final answer.