Dérivée du quotient de deux fonctions - Savoirs et savoir-faire

Elle permet de calculer la dérivée d'un quotient.

On fait la différence du produit de la dérivée de $f(x)$f, left parenthesis, x, right parenthesis par $g(x)$g, left parenthesis, x, right parenthesis et du produit de la dérivée de $g(x)$g, left parenthesis, x, right parenthesis par $f(x)$f, left parenthesis, x, right parenthesis et on divise par $[g(x)]^2$open bracket, g, left parenthesis, x, right parenthesis, close bracket, squared.

Soit la fonction $x↦\dfrac{\sin(x)}{x^2}$x, ↦, start fraction, sine, left parenthesis, x, right parenthesis, divided by, x, squared, end fraction.

On donne :

$H$H est la fonction telle que, pour tout $x$x, $H(x)=\dfrac{f(x)}{g(x)}$H, left parenthesis, x, right parenthesis, equals, start fraction, f, left parenthesis, x, right parenthesis, divided by, g, left parenthesis, x, right parenthesis, end fraction. Calculer $H'(4)$H, prime, left parenthesis, 4, right parenthesis.

$H'(x)=\dfrac{f'(x)g(x)-f(x)g'(x)}{[g(x)]^2}$H, prime, left parenthesis, x, right parenthesis, equals, start fraction, f, prime, left parenthesis, x, right parenthesis, g, left parenthesis, x, right parenthesis, minus, f, left parenthesis, x, right parenthesis, g, prime, left parenthesis, x, right parenthesis, divided by, open bracket, g, left parenthesis, x, right parenthesis, close bracket, squared, end fraction, donc $H'(4)=\dfrac{f'(4)g(4)-f(4)g'(4)}{[g(4)]^2}$H, prime, left parenthesis, 4, right parenthesis, equals, start fraction, f, prime, left parenthesis, 4, right parenthesis, g, left parenthesis, 4, right parenthesis, minus, f, left parenthesis, 4, right parenthesis, g, prime, left parenthesis, 4, right parenthesis, divided by, open bracket, g, left parenthesis, 4, right parenthesis, close bracket, squared, end fraction. On obtient :