Question

1. find the area of the parallelogram with sides $\vec{u}$ and $\vec{v}$:

(a) $\vec{u} = \langle 3, 1 \
angle$, $\vec{v} = \langle 2, 4 \
angle$.
(b) $\vec{u} = \langle 1, -1 \
angle$, $\vec{v} = \langle 2, 3 \
angle$.
(c) $\vec{u} = \langle 6, 5 \
angle$, $\vec{v} = \langle -3, -4 \
angle$.
(d) $\vec{u} = \langle 1, 2, 3 \
angle$, $\vec{v} = \langle 4, -1, -2 \
angle$.
(e) $\vec{u} = \langle 1, 1, 0 \
angle$, $\vec{v} = \langle 0, -1, 2 \
angle$.
(f) $\vec{u} = \langle 2, 0, 0 \
angle$, $\vec{v} = \langle 4, 5, 6 \
angle$.

Explanation:

Part (a)

Step1: Recall the formula for the area of a parallelogram with vectors \(\vec{u}=\langle u_1, u_2

angle\) and \(\vec{v}=\langle v_1, v_2
angle\) in 2D. The area is the absolute value of the determinant of the matrix formed by these vectors as columns (or rows), i.e., \(|\det

$$\begin{pmatrix}u_1&v_1\\u_2&v_2\end{pmatrix}$$

=

u_1v_2 - u_2v_1

\).

For \(\vec{u}=\langle 3,1
angle\) and \(\vec{v}=\langle 2,4
angle\), the determinant is \(3\times4 - 1\times2\).

Step2: Calculate the determinant.

\(3\times4 - 1\times2 = 12 - 2 = 10\). The absolute value of 10 is 10.

Step1: Use the 2D area formula \(|\det

$$\begin{pmatrix}u_1&v_1\\u_2&v_2\end{pmatrix}$$

=

u_1v_2 - u_2v_1

\) for \(\vec{u}=\langle 1,-1

angle\) and \(\vec{v}=\langle 2,3
angle\).
The determinant is \(1\times3 - (-1)\times2\).

Step2: Compute the determinant.

\(1\times3 - (-1)\times2 = 3 + 2 = 5\). The absolute value is 5.

Step1: Apply the 2D area formula \(|\det

$$\begin{pmatrix}u_1&v_1\\u_2&v_2\end{pmatrix}$$

=

u_1v_2 - u_2v_1

\) for \(\vec{u}=\langle 6,5

angle\) and \(\vec{v}=\langle -3,-4
angle\).
The determinant is \(6\times(-4) - 5\times(-3)\).

Step2: Calculate the determinant.

\(6\times(-4) - 5\times(-3)= -24 + 15 = -9\). The absolute value is 9.

Answer:

10

Part (b)