Math 215 - Multivariate Calculus - Schedule

9:00 AM Jamboard Links

G1	G2	G3	G4	G5	G6	G7
Kallan DuPaix Spencer Hatch Zack Kunkel Marissa Mavy Santiago Meza Jr	Spencer Blau Jordan Cluff Ryan Cox Makenzy Pharis Gavin Slater	Ethan Barrus Rachel Hardy Parker Kemp Denali Russell Cecilia Sanders	Jeremy Boyce Karen Castillo Avendano Mason Peterson Luke Romeril Nathan Thompson	Kylar Dominguez Pluma Logan Grover Tanner Harding Olivia Houghton Jae Kim	Kai Alger Nathan Bryans Lucy Fisher Chase Fry Braydon Robinson	Evan Duker Ralph Oliver Tyler Stokes

12:45 PM Jamboard Links

G1	G2	G3	G4	G5	G6
Adam Hopkins Oscar Enrique Gonzalez Mosqueda Reed Hunsaker Rick Miller Trevor Fike	Forrest Thompson Hamilton Birkeland Jeremy Jacobsen Michael Clarke	Adrick Checketts Alan Loureiro Christian Shamo Preston Yost	Carter Cooper Chad Larkin Joshua Strang Michael Ruiz	Brian Odhiambo Cheyenne Pratt Jacob Gravelle Matty Davis	Aaron Reed Brad Johnston Hayley Kerkman Jaden Camargo Tanner Anderson

Inquiry-Based Learning

Remember to share your work in Perusall.

You earn participation points when you present things in class that you shared in Perusall.
There is no requirement that you get everything correct, nor finish an entire problem. Try everything.
When you discover something you believe is worth sharing, add it to Perusall.

Draw the parametric curve $x=3t$, $y=t^2$ for $-1\leq t\leq 3$. Mark the point $t=2$ on your graph. Below is a table you can use to help you (you'll need to fill in the missing 2 points). $$\begin{array}{c|c} t&(x,y)\\\hline -1&(-3,1)\\ 0&(0,0)\\ 1&\\ 2&\\ 3&(9,9) \end{array}$$
A rover follows the path given by $\vec r(t) = (3t,t^2)$. Find the velocity of the rover at $t=2$.
Give a vector equation of the tangent line to the rover's path at $t=2$, so $$\begin{pmatrix}x\\y\end{pmatrix} = \begin{pmatrix}?\\?\end{pmatrix} t+\begin{pmatrix}?\\?\end{pmatrix}.$$
Give the rover's speed at any time $t$.

Let's practice taking a screenshot in group. Open your Jamboard. On windows, the commmand is WindowKey+Shift+S

Consider the parametric curve $\vec r(t) = (3-2t^2,4t+5)$ for $-1\leq t\leq 2$.
- Draw the curve.
- Find $\frac{d\vec r}{dt}$. Then state $\frac{dx}{dt}$, $\frac{dy}{dt}$, and $\frac{dy}{dx}$, all in terms of $t$.
- At $t=1$, state the point on the curve and a vector tangent to the curve. Then give a vector equation of the tangent line to the curve at $t=1$.
An object travels along straight lines. Its velocity is $ (0,3,4) $ m/s for 2 seconds, and then turns so its velocity is $ (1,2,-2) $ m/s for 5 seconds. Show the total distance (arc length) traveled by the object is 25m. [Hint: find the speed from the velocity.]
Find the arc length of the curve $\vec r(t) = (t^2, t^3)$ for $0\leq t\leq 2$. Recall the arc length formula is $$\int_C ds = \int_a^b\sqrt{\left(\frac{dx}{dt}\right)^2+\left(\frac{dy}{dt}\right)^2}dt.$$ Actually compute any integrals you encounter.
Consider again the curve $C$ parametrized by $\vec r(t) = (3-2t^2,4t+5)$ for $-1\leq t\leq 2$.
- Set up a formula to compute the length of the curve.
- A wire lies along the curve $C$. The density (mass per length) of the wire at a point $(x,y)$ on the curve is given by $\delta(x,y) = y+2$. Set up an integral formula that gives the total mass of the wire.
- The wire contains charged particles. The charge density (charge per length) at a point $(x,y)$ on the curve is given by the product $q(x,y)=xy$. Set up an integral formula that gives the total charge on the wire.