Mister Exam
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- Derivative of a implicit defined function
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- Partial derivative of the function
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How to use it?
- Derivative of:
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Derivative of sqrt(16-x^2)
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Derivative of sqrt(5x-1)
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Derivative of f(x)=5x³-4x²-3x+2
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Derivative of 4sinx
- Integral of d{x}:
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sqrt(16-x^2)
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Identical expressions
- sqrt(sixteen -x^ two)
- square root of (16 minus x squared )
- square root of (sixteen minus x to the power of two)
- √(16-x^2)
- sqrt(16-x2)
- sqrt16-x2
- sqrt(16-x²)
- sqrt(16-x to the power of 2)
- sqrt16-x^2
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Similar expressions
- sqrt(16+x^2)
Derivative of sqrt(16-x^2)
The solution
You have entered
[src]
_________ / 2 \/ 16 - x
$$\sqrt{- x^{2} + 16}$$
/ _________\ d | / 2 | --\\/ 16 - x / dx
$$\frac{d}{d x} \sqrt{- x^{2} + 16}$$
Detail solution
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Let .
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Apply the power rule: goes to
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Then, apply the chain rule. Multiply by :
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Differentiate term by term:
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The derivative of the constant is zero.
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The derivative of a constant times a function is the constant times the derivative of the function.
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Apply the power rule: goes to
So, the result is:
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The result is:
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The result of the chain rule is:
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The answer is:
The first derivative
[src]
-x ------------ _________ / 2 \/ 16 - x
$$- \frac{x}{\sqrt{- x^{2} + 16}}$$
The second derivative
[src]
/ 2 \
| x |
-|1 + -------|
| 2|
\ 16 - x /
---------------
_________
/ 2
\/ 16 - x
$$- \frac{\frac{x^{2}}{- x^{2} + 16} + 1}{\sqrt{- x^{2} + 16}}$$
The third derivative
[src]
/ 2 \
| x |
-3*x*|1 + -------|
| 2|
\ 16 - x /
------------------
3/2
/ 2\
\16 - x /
$$- \frac{3 x \left(\frac{x^{2}}{- x^{2} + 16} + 1\right)}{\left(- x^{2} + 16\right)^{\frac{3}{2}}}$$
The graph