Hàm số y = ( x^2 + 1 )^3 có đạo hàm cấp ba là:

Cách 1:

\[\begin{array}{*{20}{l}}{ch{\rm{ }}1:}\\\begin{array}{l}y\prime = 3{({x^2} + 1)^2}({x^2} + 1)\prime = 6x{({x^2} + 1)^2}\\y\prime \prime = 6{({x^2} + 1)^2} + 6x.2({x^2} + 1).2x\\ = 6{({x^2} + 1)^2} + 24{x^2}({x^2} + 1)\\y\prime \prime \prime = 12({x^2} + 1).2x + 24.2x.({x^2} + 1) + 24{x^2}.2x\\ = 24x({x^2} + 1) + 48x({x^2} + 1) + 48{x^3}\\ = 24x({x^2} + 1 + 2({x^2} + 1) + 2{x^2}) = 24x(5{x^2} + 3)\end{array}\end{array}\]

Cách 2:

\[\begin{array}{*{20}{l}}{y = {{\left( {{x^2} + 1} \right)}^3} = {x^6} + 3{x^4} + 3{x^2} + 1}\\{y' = 6{x^5} + 12{x^3} + 6x}\\{y'' = 30{x^4} + 36{x^2} + 6}\\{y''' = 120{x^3} + 72x = 24x\left( {5{x^2} + 3} \right)}\end{array}\]