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What is the midpoint of the line segment with endpoints (3.2 2.5) and (1.6 -4.5)?
To find the midpoint of the line segment with endpoints (3.2, 2.5) and (1.6, -4.5), use the midpoint formula: ((x_m, y_m) = \left(\frac{x_1 + x_2}{2}, \frac{y_1 + y_2}{2}\right)). Plugging in the values, we get (x_m = \frac{3.2 + 1.6}{2} = 2.4) and (y_m = \frac{2.5 - 4.5}{2} = -1). Therefore, the midpoint is (2.4, -1).
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What is the midpoint of the line segment with endpoints (16) and -34?
To find the midpoint of the line segment with endpoints 16 and -34, you can use the midpoint formula, which is ((x_1 + x_2) / 2). Here, (x_1 = 16) and (x_2 = -34). Thus, the midpoint is ((16 + (-34)) / 2 = (-18) / 2 = -9). Therefore, the midpoint of the line segment is -9.
1The length of the major axis of the ellipse below is 16 and the length of the red line segment is 8 How long is the blue line segment?
8
Gr equals 16 Br equals 8 and B is between G and R Is B the midpoint of segment Gr?
Yes, because GB = GR - RB
Can you draw me a line 16 mm long?
I'm unable to create visual content directly, but I can guide you on how to draw a 16 mm line. You can use a ruler to measure 16 mm on a piece of paper and mark the endpoints, then connect them with a straight line. If you're using design software, you can set the line length to 16 mm using the shape or line tool.
Midpoint of 16 and 21?
To find the midpoint of 16 and 21, you add the two numbers together and divide by 2. So, (16 + 21) / 2 = 37 / 2 = 18.5. Therefore, the midpoint is 18.5.
What is the midpoint of the line segment with endpoints (16) and -34?
To find the midpoint of the line segment with endpoints 16 and -34, you can use the midpoint formula, which is ((x_1 + x_2) / 2). Here, (x_1 = 16) and (x_2 = -34). Thus, the midpoint is ((16 + (-34)) / 2 = (-18) / 2 = -9). Therefore, the midpoint of the line segment is -9.
What is the midpoint of the line segment with endpoints 16 5 and -6 -9?
If you mean endpoints of (16, 5) and (-6, -9) then its midpoint is (5, -2)
What is the perpendicular bisector equation of the line segment whose endpoints are at -1 3 and -2 -5?
Endpoints: (-1, 3) and (-2, -5) Midpoint: (-3/2, -1) Slope: 8 Perpendicular slope: -1/8 Perpendicular bisector equation: y --1 = -1/8--3/2 => y = -1/8x -19/16
Is line segment AB the same as line segment BA?
Yes, while naming a line segment, as long as the two points are on the line, it does not matter what order they are in or which points they are. well their not
1The length of the major axis of the ellipse below is 16 and the length of the red line segment is 8 How long is the blue line segment?
8
What is the class midpoint?
midpoint between 4-16
What is the perpendicular bisector equation of the line whose end points are at 3 5 and 7 7 on the Cartesian plane?
Endpoints: (3, 5) and (7,7) Midpoint: (5, 6) Slope: 1/2 Perpendicular slope: -2 Perpendicular bisector equation: y-6 = -2(x-5) => y = -2x+16
The class midpoint is?
midpoint between 4-16
Gr equals 16 Br equals 8 and B is between G and R Is B the midpoint of segment Gr?
Yes, because GB = GR - RB
How do you find the midpoint the slope the perpendicular slope and the equation for the perpendicular bisector of the line segment joining the points of 3 5 and 7 7?
Midpoint = (3+7)/2, (5+7)/2 = (5, 6) Slope of line segment = 7-5 divided by 7-3 = 2/4 = 1/2 Slope of the perpendicular = -2 Equation of the perpendicular bisector: y-y1 = m(x-x1) y-6 =-2(x-5) y = -2x+10+6 Equation of the perpendicular bisector is: y = -2x+16
Can you draw me a line 16 mm long?
I'm unable to create visual content directly, but I can guide you on how to draw a 16 mm line. You can use a ruler to measure 16 mm on a piece of paper and mark the endpoints, then connect them with a straight line. If you're using design software, you can set the line length to 16 mm using the shape or line tool.
Midpoint of 16 and 21?
To find the midpoint of 16 and 21, you add the two numbers together and divide by 2. So, (16 + 21) / 2 = 37 / 2 = 18.5. Therefore, the midpoint is 18.5.
