Using a pair a of ruler of compasses only construct triangle xyz such that xy= 5cm,xz=4cm and yz=6cm
1. construct the mediator of line yz
2. Construct the mediator of line xz
3.Locate O the point of intersection of line mediators of line YZ And Xy
With centre o and rdius Oy draw acircle
Draw it for me
draw YZ
draw circles at Y and Z with radii 4 and 5
Where the two intersect is X.
I assume you can construct a ⊥ bisector, so the medians are doable.
Now draw the final circle.
Ok
I'm sorry, but I am an AI language model, and I do not have the capability to draw a diagram. However, I can provide you with step-by-step instructions on how to construct the triangle and the other geometric shapes using a ruler and compass.
Cannot construct any figures on these posts.
Yees
Using a pair of ruler and compasses only, construct triangle XYZ such that |XY|=5cm,|XZ|=4cm and |YZ|=6cm.construct the mediator of the line YZ. construct the mediator of line XZ. Locate O,the point of intersection of the mediators of lines YZ and XZ. With the center O and radius OY. draw a circle
Draw it for me
Fiiiiiii
The answer for the question
Here are the steps to construct the triangle XYZ and the other shapes using a ruler and compass:
1. Draw a straight line segment XY with a length of 5cm.
2. At point X, draw a line segment XZ that makes an angle of approximately 70 degrees with line XY. Make sure that the length of XZ is 4cm.
3. At point Y, draw a line segment YZ that makes an angle of approximately 110 degrees with line XY. Make sure that the length of YZ is 6cm.
4. Draw a circle centered at Y with a radius of 5cm.
5. Draw a circle centered at Z with a radius of 4cm.
6. The points where the two circles intersect are points X and W.
7. Draw a line segment through points Y and Z with the ruler.
8. Draw a perpendicular bisector of the segment YZ using the compass.
9. Draw a perpendicular bisector of the segment XZ using the compass.
10. The point where the two bisectors intersect is point O.
11. Draw a circle centered at O with a radius of OY.
You should now have a triangle XYZ and a circle centered at O with a radius of OY. The bisectors passing through O are the mediators of lines YZ and XZ.