Find the linear equation between the following two points: (-2, 1) and (-4, -2). y=−32x−6 y=32x+2 y=12x y=32x+8 y=32x+4 Identify which of the following linear equations describes a line that has a slope, m = 32 , and goes through point (2, 5) using the point-slope formula: y - y1 = m(x - x1). y=−32x+2
Find the linear equation between the following two points: (-2, 1) and (-4, -2). y=−32x−6 y=32x+2 y=12x y=32x+8 y=32x+4 Identify which of the following linear equations describes a line that has a slope, m = 32 , and goes through point (2, 5) using the point-slope formula: y - y1 = m(x - x1). y=−32x+2
Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
Problem 1RQ
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Question
Find the linear equation between the following two points: (-2, 1) and (-4, -2).
- y=−32x−6
- y=32x+2
- y=12x
- y=32x+8
- y=32x+4
Identify which of the following linear equations describes a line that has a slope, m = 32 , and goes through point (2, 5) using the
- y=−32x+2
- y+2=32x
- 32y=x+2
- y=32x+2
- y=32+2x
Find the linear equation between the following two points: (3, -1) and (2, 1).
- y=−25x+5
- y=5
- y=−2x+3
- y=2x+5
- y=−2x+5
Which of the following is the most useful to explain how to graph (20, -15) on a Cartesian graph?
- When graphing (20, -15) move 20 spaces to the right of the origin and from there move 15 spaces down.
- When graphing (20, -15) move 20 spaces to the right of the origin and returning to the origin move 15 spaces down.
- When graphing (20, -15) move 20 spaces to the right of the origin and from there move 15 spaces up.
- When graphing (20, -15) move 15 spaces to the left of the origin and from there move 20 spaces up.
- When graphing (20, -15) move 20 spaces to the left of the origin and from there move 15 spaces down.
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