$\tkct{cut from 19.4F}$ Mid $\tkco{ S}$ | 133 - FML 3 - 18.1W e.g. 39.1_$\tkcth…

Cross Product and Area

3 Activities

 Consider the points P1=(1,4,1)\bcb{P_1 = (1,4,1)}P1​=(1,4,1), P2=(3,4,−1)\bcb{P_2 = (3,4,-1)}P2​=(3,4,−1), P3=(2,4,−2)\bcb{P_3 = (2,4,-2)}P3​=(2,4,−2), P4=(0,2,0)\bcb{P_4 = (0,2,0)}P4​=(0,2,0). 
Find the area of the triangle with vertices P1, P2, P3\bcb{P_1,\, P_2,\, P_3}P1​,P2​,P3​. 

Area =

I don't know

Practice: Cross Product and Areas

Find the area of the triangle with vertices M(−3,−1,0)M(-3,-1,0)M(−3,−1,0), N(3,1,−1)N(3,1,-1)N(3,1,−1), and P(−2,−1,0)P(-2,-1,0)P(−2,−1,0)

Practice Question: Application of Cross Product

Practice Question: Application of Cross Product
Find the area of the triangle that has edges defined by 𝑢⃗=(−1,0,2)𝑢⃗ = (−1,0,2) u⃗=(−1,0,2)and 𝑣=(3,−3,0)𝑣=(3,−3,0)v=(3,−3,0)

133 - FML 3 - 18.1W e.g. 28

Find the area of the parallelogram with vertices at (2,−3), (0,2), (13,−14),\bcb{(2,-3),~(0,2),~(13,-14),}(2,−3), (0,2), (13,−14), and (11,−9)\bcb{(11,-9)}(11,−9).

133 - FML 3 - 18.1W e.g. 27

 Find the area of the triangle defined by the vectors [57]\bcb{\boldsymbol{ \begin{bmatrix} 5 \\ 7 \end{bmatrix}}}[57​] and [31]\bcb{\boldsymbol{ \begin{bmatrix} 3 \\ 1 \end{bmatrix}}}[31​].

133 - FML 3 - 18.1W e.g. 39.1

 Consider the points P1=(1,4,1)\bcb{P_1 = (1,4,1)}P1​=(1,4,1), P2=(3,4,−1)\bcb{P_2 = (3,4,-1)}P2​=(3,4,−1), P3=(2,4,−2)\bcb{P_3 = (2,4,-2)}P3​=(2,4,−2), P4=(0,2,0)\bcb{P_4 = (0,2,0)}P4​=(0,2,0). 
Find the area of the triangle with vertices P1, P2, P3\bcb{P_1,\, P_2,\, P_3}P1​,P2​,P3​. 

Practice: Cross Product (2)

Let X=(0, 0, 0), Y=(1, 1, 0), & Z=(0, 1, 1).X=(0,~0,~0),~Y=(1,~1,~0),~\&~Z=(0,~1,~1).X=(0, 0, 0), Y=(1, 1, 0), & Z=(0, 1, 1).. 
What is the area of the triangle XYZ?

A parallelogram in R3R^3R3 has vertices A(−1,1,2)A\left(-1,1,2\right)A(−1,1,2), B(1,−2,8)B\left(1,-2,8\right)B(1,−2,8) and C=(3,−1,2)C=\left(3,-1,2\right)C=(3,−1,2). 

Additional practice problems--vector products

Additional Practice Problems--Vector Products
1. If u⃗=(−2,3,−1),  v⃗=(−1,−2,3)\vec{u}=\left(-2,3,-1\right),\ \ \vec{v}=\left(-1,-2,3\right)u=(−2,3,−1),  v=(−1,−2,3), find
a) u⃗ ∙ v⃗\vec{u}\ \bullet\ \vec{v}u ∙ v

 Find the area of the parallelogram defined by the vectors  u→=(1,3,0)\overrightarrow{u}=\left(1,3,0\right)u=(1,3,0)and v→=(−2,0,1)\overrightarrow{v}=\left(-2,0,1\right)v=(−2,0,1).

Cross Product and Area

Find the area of the parallelogram ABCD that has vertices A(1,2,5)A(1,2,5)A(1,2,5), B(−3,0,2)B(-3,0,2)B(−3,0,2), C(−3,−5,−2)C(-3,-5,-2)C(−3,−5,−2) and D(1,−3,1)D(1,-3,1)D(1,−3,1).

$\tkct{cut from 19.4F}$ Mid $\tkco{ S}$ | 133 - FML 3 - 18.1W e.g. 39.1_$\tkcth…

Related Topics

Cross Product and Area

Consider the points $\bcb{P_1 = (1,4,1)}$ , $\bcb{P_2 = (3,4,-1)}$ , $\bcb{P_3 = (2,4,-2)}$ , $\bcb{P_4 = (0,2,0)}$ .

Find the area of the triangle with vertices $\bcb{P_1,\, P_2,\, P_3}$ .

More Cross Product and Area Questions:

Practice: Cross Product and Areas

Practice Question: Application of Cross Product

133 - FML 3 - 18.1W e.g. 28

133 - FML 3 - 18.1W e.g. 27

133 - FML 3 - 18.1W e.g. 39.1

Practice: Cross Product (2)

Additional practice problems--vector products

Cross Product and Area

$\tkct{cut from 19.4F}$ Mid $\tkco{ S}$ | 133 - FML 3 - 18.1W e.g. 39.1_$\tkcth…

Related Topics

Cross Product and Area

Consider the points P1=(1,4,1)\bcb{P_1 = (1,4,1)}P1​=(1,4,1), P2=(3,4,−1)\bcb{P_2 = (3,4,-1)}P2​=(3,4,−1), P3=(2,4,−2)\bcb{P_3 = (2,4,-2)}P3​=(2,4,−2), P4=(0,2,0)\bcb{P_4 = (0,2,0)}P4​=(0,2,0).

Find the area of the triangle with vertices P1, P2, P3\bcb{P_1,\, P_2,\, P_3}P1​,P2​,P3​.

More Cross Product and Area Questions:

Practice: Cross Product and Areas

Practice Question: Application of Cross Product

133 - FML 3 - 18.1W e.g. 28

133 - FML 3 - 18.1W e.g. 27

133 - FML 3 - 18.1W e.g. 39.1

Practice: Cross Product (2)

Additional practice problems--vector products

Cross Product and Area

Consider the points $\bcb{P_1 = (1,4,1)}$ , $\bcb{P_2 = (3,4,-1)}$ , $\bcb{P_3 = (2,4,-2)}$ , $\bcb{P_4 = (0,2,0)}$ .

Find the area of the triangle with vertices $\bcb{P_1,\, P_2,\, P_3}$ .