Answer with explanation:
Given: A kite U V W X
To Prove: Diagonals of kite U V W X, that is ,U W and V X are Perpendicular.
Proof:
Slope between two points having position vector or coordinates ,[tex]A(x_{1},y_{1}) {\text{and}} B(x_{2},y_{2})[/tex] is given by:
[tex]=\frac{\text{Difference in y coordinates}}{\text{Difference in x coordinates}}\\\\=\frac{y_{2}-y_{1}}{x_{2}-x_{1}}[/tex]
Step 1:
Determine the slope of XV.
Suppose position vector of point X is (a,b) and Position vector of point V is (p,q).
The slope of XV is
[tex]m_{1}=\frac{q-b}{p-a}[/tex]
Step 2:
Determine the slope of UW.
Suppose position vector of point U is (m,n) and Position vector of point W is (s,t).
The slope of U W is :
[tex]m_{2}=\frac{t-n}{s-m}[/tex]
Step 3: The slopes of the diagonals are, [tex]m_{1},m_{2}[/tex]
Also, [tex]m_{1}\times m_{2}=-1[/tex]
→→Showing that,The diagonals of kite UVWX are perpendicular to each other.
