Vectors Jeopardy Template

Vocabulary

Vector Basics

More with vectors

Applications

More!

100

A representation of a quantity that involves a magnitude and direction

Directed Line Segment (Vector)

100

Given u = <5, -1> and v = <-6,7> find:

2u - 3v

<28, -23>

100

What value of b makes these vectors orthogonal?

<7, -4, 2> and <b, 6, 8> ?

8/7

100

Write the sphere in standard form, identify the center (and name the plane the center lies in) and the radius as an exact value.

x² + y²+ z²- 8x + 20y - 9 = 0

(x-4)²+(y+10)²+z²=125

Center: (4, -10, 0) x-y plane

Radius: 5 root 5

100

State the octant that contains the point] (1, -3, -5).

200

Position where a Vector ends

Terminal point

200

Find the vector in component form that has an initial point A (-8, 4, 7) and terminal point B (1, -1, 9)

<9,-5, 2>

200

Find the angle between vectors a and b.

a= <1, 2, 3> & b = <-3, 5, -9>

Round to the closest degree!

120^o

200

Find the angle between the two vectors.

6(cos 93^o, sin 93^o) and 10(cos 176^o, sin 176^o)

83^o

200

State all octants where xy > 0.

1, 3, 5, 7

300

The directed line segment drawn after completing u + v

Resultant

300

Find the magnitude of the vector <-7, 4>. Write as an exact value.

Find the direction. Round to the nearest degree.

root 65

150 degrees

300

Find a vector orthogonal to both u and v.

u= <1, 1, 0> and v = <-3, 4, 7>

Write as a linear combination.

7i - 7j + 7k OR -7i +7j -7k

300

Find the projection of u onto v and write as the sum of two orthogonal vectors.

u = <3, 5> and v = <-4, 4>

w₁ = <-1, 1> and w₂ = <4, 4>

<-1, 1> + <4, 4> = <3, 5>

300

Find the following: W x V

given: W = 2i - 7k and V = -3j + 6k

-21i - 12j - 6k

400

The name of a 3 dimensional circle

Sphere

400

Write the exact position for the vector with a reference angle of 60 degrees in quadrant 3 and a magnitude of 18.

<-9, -9 root 3>

400

Write the sum of u and v in magnitude and directional form. Round to tenths.

____< cos ____, sin ____>

u=5<cos 24^o, sin 24^o>

v=-9<cos 228^o, sin 228^o>

13.7<cos 39.5^o, sin 39.5^o>

400

Write the equation of a sphere with endpoints of the diameter at (-1, 4, 8) and (7, -2, 2).

(x-3)² +(y-1)² + (z-5)²= 34

400

Make an equivalent statement given a, b and c are vectors.

a dot 2(b x c)

(ax2b) dot c OR

(axb) dot 2c OR

(2axb) dot c

500

The name of the product of 2 3D vectors that results in another vector

Cross Product

500

Simplify: 2u dot -3v

Given:

u = <-root 8, 2root 5> & v=<5 root 2, 4 root 5>

-120

500

Find the area of a triangle in 3D with the vertices:

A(0, 0, 0) B(4, 8, -2) and C (-4, -3, 1)

Round to the nearest 100th!

10.25 square units

500

Find the volume of a parallelepiped that emanates from the origin and contains the following points as the terminal point of each side of the figure.

A(3, -4, 5) B(-6, 1, 1) C (12, 12, 12)

756 square units

500

Find a vector in the opposite direction of <-3, 8> with a magnitude of 5.

Round the the closest 10ths.

<1.8, - 4.7>