Find the Minimum Value of 3 cos x + 4 sin x + 8
Question:
The minimum value of \[ 3\cos x+4\sin x+8 \] is
The minimum value of \[ 3\cos x+4\sin x+8 \] is
Solution
For an expression of the form
\[ a\cos x+b\sin x \]
the maximum value is
\[ \sqrt{a^2+b^2} \]
and the minimum value is
\[ -\sqrt{a^2+b^2} \]
Here,
\[ a=3, \qquad b=4 \]
Therefore,
\[ \sqrt{a^2+b^2} = \sqrt{3^2+4^2} \]
\[ = \sqrt{9+16} \]
\[ = \sqrt{25} =5 \]
Hence,
\[ -5 \leq 3\cos x+4\sin x \leq 5 \]
Adding \(8\) throughout,
\[ 3 \leq 3\cos x+4\sin x+8 \leq 13 \]
Therefore, the minimum value is
\[ \boxed{3} \]
Final Answer
\[ \boxed{ \text{Minimum value}=3 } \]
Correct Option: (d)