Points X, Y and Z are collinear such that d (X,Y) = 17, d (Y, Z) = 8, find d (X, Z).

Points X,Y,Z are collinear such that d(X,Y) = 17 , d(Y,Z) = 8, then find d(X,Z).

Point X,Y,Z are collinear such that d(X,Y) = 17 , d(Y,Z) = 8 , find d(X,Z) .

From the information given below, find which of the points is between the other two. If the points are not collinear, state so. d(X, Y) = 15, d(Y, Z) = 7, d (X, Z) = 8

If X = 5Y = 8Z, find X:Y:Z.

If x, y and z are three integers such that x + y = 8, y + z = 13 and z + x =17, then the value of (x^2)/(yz) is :

In Figure, /_X=62^@,\ /_X Y Z=54^@ . If Y O\ a n d\ Z O are bisectors of /_X Y Z\ a n d\ /_X Z Y respectively of X Y Z , find /_O Z Y\ a n d\ /_Y O Z .

In Fig.71, if A B C D , then the values of x ,\ y\ a n d\ z are x=56 ,\ y=47 ,\ z=77 (b) x=47 ,\ y=56 ,\ z=77 x=77 ,\ y=56 ,\ z=47 (d) x=56 ,\ y=77 ,\ z=47