Given the line segment AB, extend AB to C so that BC = 1 / 2Ab, D is the midpoint of AB, DC = 10cm, and calculate the length of ab

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• 1. As shown in the figure, take a point D on AB, take a point C on the extension line of AB, so that BD = 1 / 3AB = 1 / 4bc, and the midpoint of line AB and BC are m, n respectively, Mn = 7cm, Finding the length of line AB, CD
• 2. As shown in the figure, line BD equals one third AB equals one fourth CD, points m and N are the midpoint of line AB and CD respectively, and Mn equals 20 cm, so find the length of AC
• 3. As shown in the figure, ab = CD, CB = 1 / 3AB, points m and N are the midpoint of AB and CD respectively, and Mn = 8cm Anyway, there are two answers. What should I do In silence
• 4. As shown in the figure, line BD = 1 / 3AB = 1 / 4CD, points m and N are the midpoint of line AB and CD respectively, and Mn = 20cm |------|--|----|----|---------| A M D B N C
• 5. As shown in the figure, line AB = 8cm, C is the point on line AB, AC = 3.2cm, M is the midpoint of AB, n is the midpoint of AC. (1) find the length of line cm; (2) find the length of line Mn
• 6. Given that four points a, B, C and D are on the straight line L, ab = 10cm, CD = 4cm, and points m and N are the midpoint of AC and BD respectively, the length of segment Mn is calculated I'm in a hurry, By 20 o'clock today A total of 10 cases Please list them one by one DC = CD, so there are many cases I know the answer, To write a little paper, ..... And please use easy to understand language to answer,,,,,,
• 7. If M is the midpoint of AC, n is the midpoint of BC, and ab = 10cm, the length of Mn is obtained
• 8. As shown in the figure, the line AB = 10cm, the point C is any point on AB, the point m is the midpoint of AC, and the point n is the midpoint of CB
• 9. As shown in Figure 5, point C is the point on line AB, point m is the midpoint of line AC, and point n is the midpoint of line BC. (2) AC: CB = 3:2, Mn = 10cm, Find the length of am A----M----C--N--B
• 10. As shown in the figure, point C is on line AB, and points m and N are the midpoint of AC and BC respectively. (1) if AC = 8cm and CB = 6cm, find the length of line Mn; (2) if C is a line As shown in the figure, point C is on line AB, and points m and N are the midpoint of AC and BC respectively (1) If AC = 8cm, CB = 6cm, find the length of line Mn; (2) Can you guess the length of Mn if C is any point of AB, AC + CB = A and other conditions remain unchanged;
• 11. The segment AB of point C is 5:3, and the segment AB of point D is 3:5. Given DC = 10cm, find the length of ab
• 12. As shown in the figure, given point C, segment AB is 5:3, and point D is the midpoint of AC. if DC = 10cm, calculate the length of ab
• 13. Given that the segment AB at point C is 5:3, the segment AC at point D is 3:5, and the length of DC is 10cm, then the length of AB is?
• 14. As shown in the figure, given the line AB = 10cm, there is a point C on AB, and AC: BC = BC: AB, find the length of AC
• 15. As shown in the figure, given that line AB = 10cm, point C is on the extension line of AB, and points m and N are the midpoint of AC and BC respectively, then how many centimeters is Mn equal to A————M—B——N——C
• 16. As shown in the figure: a -- m -- B -- N -- C, the line AB = 10cm is known. If C is a line segment, any point on the extended line, Mn is the midpoint of AC and BC respectively, Finding the length of Mn
• 17. It is known that B and C are any two points on the line ad, M is the midpoint of AB, and N is the midpoint of CD. If BC = B, Mn = a, find the length of the line ad. (expressed by a, b) A. M, B, C, N, D are arranged from left to right
• 18. Given that C is the midpoint of line AB, D is any point on AC, m n is the midpoint of ad dB, AC = 7, find the length of Mn
• 19. Given that the line segment AB = 1cm, extend AB to point C to make BC = 2Ab, and then extend Ba to point d to make ad = 3AB, then DC = () cm, DB = () cm, Da = () cm
• 20. Draw line AB = 1cm, extend AB to point C, make BC = Zab, and then extend Ba to point D, make ad = 3AB, then DC=____ cm,DA=____ cm.