A linear relation is a direct constant proportionality. Every variable is raised to power of 1 and a change in one variable will produce a corresponding change in the other. In this activity, we’ll be modeling a linear relation of distance with regards to velocity and time.
|
Grid Size: S M L | Simple View: | MinView: |
Coord: x-axis y-axis | Grid Lines: x-axis y-axis | |||
Grid: | 12x12 inches | 24x24 inches | 36x36 inches | |
72x72 inches | 96x96 inches | 192x192 inches | ||
1x1 inches | 2x2 inches | Fraction: | ||
xy-Range: | ||||
|
||||
|
||||
Quad: | 1 Quadrant | 4 Quadrants | 1&4 Quadrants | |
Units: | US Customary | Metric | Ruler: |
Labels: |
|
|
|
Font
px
|
|
Tics Lines: |
|
Width
px
|
Hash Lines: |
|
Width
px
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
(
,
in
) in
|
|
degrees
|
|
|
Move the robot down 10 units using driveDistance() block, then move the robot up 32 units in 8 seconds using driveTime() block. |
|
|
|||||||||||
|
|||||||||||