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  \require{AMSmath}


Uitwerkingen


a.
\eqalign{   & f(x) = \frac{{1 - x}} {{\sqrt x }}  \cr   & f'(x) = \frac{{ - 1 \cdot \sqrt x  - \left( {1 - x} \right) \cdot \frac{1} {{2\sqrt x }}}} {{\left( {\sqrt x } \right)^2 }}  \cr   & f'(x) = \frac{{ - \sqrt x  - \frac{1} {{2\sqrt x }} + \frac{x} {{2\sqrt x }}}} {x}  \cr   & f'(x) = \frac{{ - x - \frac{1} {2} + \frac{x} {2}}} {{x\sqrt x }} =  - \frac{{x + 1}} {{2x\sqrt x }} \cr}

Soms kan het handig zijn om eerst het functievoorschrift anders te schrijven:

\eqalign{   & f(x) = \frac{{1 - x}} {{\sqrt x }} = \frac{1} {{\sqrt x }} - \sqrt x  = x^{ - \frac{1} {2}}  - x^{\frac{1} {2}}   \cr   & f'(x) =  - \frac{1} {2}x^{ - 1\frac{1} {2}}  - \frac{1} {2}x^{ - \frac{1} {2}}   \cr   & f'(x) =  - \frac{1} {{2x\sqrt x }} - \frac{1} {{2\sqrt x }} =  - \frac{{x + 1}} {{2x\sqrt x }} \cr}

Maar of dat hier nu handig is...


b.
\eqalign{   & f(x) = \frac{{2x - 3}} {{\sqrt {5x + 1} }}  \cr   & f'(x) = \frac{{2\sqrt {5x + 1}  - \left( {2x - 3} \right) \cdot \frac{1} {{2\sqrt {5x + 1} }} \cdot 5}} {{\left( {\sqrt {5x + 1} } \right)^2 }}  \cr   & f'(x) = \frac{{2\sqrt {5x + 1}  - \frac{{5\left( {2x - 3} \right)}} {{2\sqrt {5x + 1} }}}} {{5x + 1}}  \cr   & f'(x) = \frac{{\left( {2\sqrt {5x + 1} } \right)^2  - 5\left( {2x - 3} \right)}} {{2\left( {5x + 1} \right)\sqrt {5x + 1} }}  \cr   & f'(x) = \frac{{4\left( {5x + 1} \right) - 5\left( {2x - 3} \right)}} {{2\left( {5x + 1} \right)\sqrt {5x + 1} }}  \cr   & f'(x) = \frac{{10x + 19}} {{2\left( {5x + 1} \right)\sqrt {5x + 1} }} \cr}
c.

\eqalign{   & f(x) = \frac{{\sqrt {2x + 5} }}{{3x - 1}}  \cr   & f'(x) = \frac{{\frac{1}{{2\sqrt {2x + 5} }} \cdot 2 \cdot (3x - 1) - \sqrt {2x + 5}  \cdot 3}}{{{{(3x - 1)}^2}}}  \cr   & f'(x) = \frac{{\frac{{3x - 1}}{{\sqrt {2x + 5} }} - 3 \cdot \sqrt {2x + 5} }}{{{{(3x - 1)}^2}}}  \cr   & f'(x) = \frac{{3x - 1 - 3(2x + 5)}}{{\sqrt {2x + 5}  \cdot {{(3x - 1)}^2}}}  \cr   & f'(x) = \frac{{3x - 1 - 6x - 15}}{{\sqrt {2x + 5}  \cdot {{(3x - 1)}^2}}}  \cr   & f'(x) = \frac{{ - 3x - 16}}{{\sqrt {2x + 5}  \cdot {{(3x - 1)}^2}}}  \cr   & f'(x) =  - \frac{{3x + 16}}{{\sqrt {2x + 5}  \cdot {{(3x - 1)}^2}}} \cr}


d.

\eqalign{   & f(x) = \frac{{2x + 3}}{{\sqrt {x - 1} }}  \cr   & f'(x) = \frac{{2\sqrt {x - 1}  - \left( {2x + 3} \right) \cdot \frac{1}{{2\sqrt {x - 1} }}}}{{x - 1}}  \cr   & f'(x) = \frac{{2\sqrt {x - 1}  - \frac{{2x + 3}}{{2\sqrt {x - 1} }}}}{{x - 1}}  \cr   & f'(x) = \frac{{2\left( {x - 1} \right) - \frac{{2x + 3}}{2}}}{{\left( {x - 1} \right)\sqrt {x - 1} }}  \cr   & f'(x) = \frac{{4\left( {x - 1} \right) - \left( {2x + 3} \right)}}{{2\left( {x - 1} \right)\sqrt {x - 1} }}  \cr   & f'(x) = \frac{{4x - 4 - 2x - 3}}{{2\left( {x - 1} \right)\sqrt {x - 1} }}  \cr   & f'(x) = \frac{{2x - 7}}{{2\left( {x - 1} \right)\sqrt {x - 1} }} \cr}


e.

\eqalign{   & f(x) = \frac{{\sqrt x  - 1}}{{3{x^2} - 4}}  \cr   & f'(x) = \frac{{\frac{1}{{2\sqrt x }}\left( {3{x^2} - 4} \right) - \left( {\sqrt x  - 1} \right) \cdot 6x}}{{{{\left( {3{x^2} - 4} \right)}^2}}}  \cr   & f'(x) = \frac{{\frac{{3{x^2} - 4}}{{2\sqrt x }} - \left( {\sqrt x  - 1} \right) \cdot 6x}}{{{{\left( {3{x^2} - 4} \right)}^2}}}  \cr   & f'(x) = \frac{{3{x^2} - 4 - \left( {\sqrt x  - 1} \right) \cdot 6x \cdot 2\sqrt x }}{{2\sqrt x  \cdot {{\left( {3{x^2} - 4} \right)}^2}}}  \cr   & f'(x) = \frac{{3{x^2} - 4 - 12{x^2} + 12x\sqrt x }}{{2\sqrt x  \cdot {{\left( {3{x^2} - 4} \right)}^2}}}  \cr   & f'(x) = \frac{{ - 9{x^2} + 12x\sqrt x  - 4}}{{2\sqrt x  \cdot {{\left( {3{x^2} - 4} \right)}^2}}}  \cr   & f'(x) =  - \frac{{9{x^2} - 12x\sqrt x  + 4}}{{2\sqrt x  \cdot {{\left( {3{x^2} - 4} \right)}^2}}} \cr}


f.

\eqalign{   & f(x) = (2{x^3} - 2) \cdot \sqrt {x + 1}   \cr   & f'(x) = 6{x^2} \cdot \sqrt {x + 1}  + (2{x^3} - 2) \cdot \frac{1}{{2\sqrt {x + 1} }}  \cr   & f'(x) = 6{x^2} \cdot \sqrt {x + 1}  + \frac{{2{x^3} - 2}}{{2\sqrt {x + 1} }}  \cr   & f'(x) = 6{x^2} \cdot \sqrt {x + 1}  + \frac{{{x^3} - 1}}{{\sqrt {x + 1} }}  \cr   & f'(x) = 6{x^2} \cdot \sqrt {x + 1}  \cdot \frac{{\sqrt {x + 1} }}{{\sqrt {x + 1} }} + \frac{{{x^3} - 1}}{{\sqrt {x + 1} }}  \cr   & f'(x) = \frac{{6{x^2} \cdot (x + 1)}}{{\sqrt {x + 1} }} + \frac{{{x^3} - 1}}{{\sqrt {x + 1} }}  \cr   & f'(x) = \frac{{6{x^3} + 6{x^2} + {x^3} - 1}}{{\sqrt {x + 1} }}  \cr   & f'(x) = \frac{{7{x^3} + 6{x^2} - 1}}{{\sqrt {x + 1} }} \cr}


g.

\eqalign{ & f(x) = \left( {\frac{{x(x - 1)}} {{5 - x}}} \right)^5 \cr & f(x) = \left( {\frac{{x^2 - x}} {{5 - x}}} \right)^5 \cr & f'(x) = 5\left( {\frac{{x^2 - x}} {{5 - x}}} \right)^4 \cdot ... \cr & f'(x) = 5\left( {\frac{{x^2 - x}} {{5 - x}}} \right)^4 \cdot \frac{{\left( {2x - 1} \right)\left( {5 - x} \right) - \left( {x^2 - x} \right) \cdot - 1}} {{\left( {5 - x} \right)^2 }} \cr & f'(x) = 5\left( {\frac{{x^2 - x}} {{5 - x}}} \right)^4 \cdot \frac{{ - 2x^2 + 11x - 5 + x^2 - x}} {{\left( {5 - x} \right)^2 }} \cr & f'(x) = 5\left( {\frac{{x(x - 1)}} {{5 - x}}} \right)^4 \cdot \frac{{ - x^2 + 10x - 5}} {{\left( {5 - x} \right)^2 }} \cr & f'(x) = \frac{{5x^4 (x - 1)^4 }} {{\left( {5 - x} \right)^4 }} \cdot \frac{{ - x^2 + 10x - 5}} {{\left( {5 - x} \right)^2 }} \cr & f'(x) = \frac{{5x^4 (x - 1)^4 \left( { - x^2 + 10x - 5} \right)}} {{\left( {5 - x} \right)^6 }} \cr & f'(x) = - \frac{{5x^4 (x - 1)^4 \left( {x^2 - 10x + 5} \right)}} {{\left( {5 - x} \right)^6 }} \cr}


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