Problemas de optimización de funciones – Maximizar el volumen de una caja sin tapa SELECTIVIDAD EBAU

Corresponding to the second year of high school, this optimization problem aims to maximize the volume of a box without a lid. A square with a side of 60 cm is given, from which smaller squares will be cut from the four corners to form a box whose volume is intended to be maximized. The exercise asks what the side of the cut squares must be to satisfy the maximum volume condition. Once the function to be optimized is defined, it is derived and equated to 0. Finally, the second derivative is verified to ensure that it is a maximum. **Connect with Maths with Andrés** Youtube:    / matesconandres   Facebook:   / matesconandres   Twitter:   / matesconandres   Instagram:   / matesconandres   Google +: https://plus.google.com/+matesconandres Use the hashtag #animopupilos