Table of Contents

Navigate back to the activity.

THE VALLEY

Essentials

Main ideas

Prerequisites

Warmup

A brief derivation of the master formula from the expression for the differential of a function of two variables.

Props

Wrapup

Details

In the Classroom

Subsidiary ideas

Homework

  1. Consider the valley in this group activity, whose height $h$ in meters is given by $h={ x^2\over10}+{ y^2\over10}$, with $x$ and $y$ (and 10!) in meters. Suppose you are hiking through this valley on a trail given by \begin{eqnarray*} x=3t \qquad y=2t^2 \end{eqnarray*} with $t$ in seconds (and where “3” and “2” have appropriate units).
    1. Starting from the master formula, determine how fast you are climbing (rate of change of $h$) per meter along the trail when $t=1$. You may find it helpful to recall that $ds=|d\rr|$.
    2. Starting from the master formula, determine how fast you are climbing per second when $t=1$.

Essay questions

Enrichment