How do you find the maximum value of $f(x) = sinx+cosx$ ?

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Answer 1 · 2016-10-30T17:14:47

Please see the explanation.

The x coordinates of extrema can be found by, computing the first derivative, setting that equal to zero, and then solving for x:

Compute the first derivative:

$f'(x) = cos(x) - sin(x)$

Set equal to zero:

$0 = cos(x) - sin(x)$

Solve for x:

$cos(x) = sin(x)$

$1 = sin(x)/cos(x)$

$1 = tan(x)$

$x = tan^-1(1)$

$x = pi/4$

Because the tangent function has a period of $pi$ , the value, 1, repeats at every integer multiple of $pi$ :

$x = pi/4 + npi$ where $n = ...,-3,-2, -1, 0, 1, 2,3,...$

To determine whether this is a maximum, perform the second derivative test, using one of the values:

$f''(x) = -cos(x) - sin(x)$

Evaluate at $pi/4$

$f''(pi/4) = -cos(pi/4) - sin(pi/4) = -sqrt(2)$

The value is a negative, therefore, we have found a maximum.

How do you find the maximum value of f(x) = sinx+cosxf(x) = sinx+cosx?