Hey can you please help me posted picture of question
2 answers:
Considering the function: G(x)= 4-x^4
Graph using selected points:
\Falls to the left and falls to the right:
x y
-2 -12
-1 3
0 4
1 3
2 -12
Then plot the points given:
See attached picture:
As observed in the provided picture, the graph shows that the function G(x)= 4-x^4 has the same graph in the given problem.
Graph using selected points:
\Falls to the left and falls to the right:
x y
-2 -12
-1 3
0 4
1 3
2 -12
Then plot the points given:
See attached picture:
As observed in the provided picture, the graph shows that the function G(x)= 4-x^4 has the same graph in the given problem.
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Answer:
The product of the slopes of lines is -1.
i.e. m₁ × m₂ = -1
Thus, the lines are perpendicular.
Step-by-step explanation:
The slope-intercept form of the line equation
where
- m is the slope
- b is the y-intercept
Given the lines
y = 2/3 x -3 --- Line 1
y = -3/2x +2 --- Line 2
<u>The slope of line 1</u>
y = 2/3 x -3 --- Line 1
By comparing with the slope-intercept form of the line equation
The slope of line 1 is: m₁ = 2/3
<u>The slope of line 2</u>
y = -3/2x +2 --- Line 2
By comparing with the slope-intercept y = mx+b form of the line equation
The slope of line 2 is: m₂ = -3/2
We know that when two lines are perpendicular, the product of their slopes is -1.
Let us check the product of two slopes m₁ and m₂
m₁ × m₂ = (2/3)(-3/2 )
m₁ × m₂ = -1
Thus, the product of the slopes of lines is -1.
i.e. m₁ × m₂ = -1
Thus, the lines are perpendicular.