Answer:
x = 30
y = 59.33
Step-by-step explanation:
We have Redrawn the diagram by naming the quadrilateral.
Now According to redrawn diagram;
∠ A = 90°
∠ B = [tex](2y-3)\°[/tex]
∠ C = [tex]3x\°[/tex]
∠ D = [tex](y+5)\°[/tex]
We need to find the value of 'x' and 'y'.
Solution:
Now we know that;
"If a quadrilateral whose all four sides or vertices touches the circle then it is said to be cyclic quadrilateral."
The Given diagram is a Cyclic Quadrilateral.
Now By Properties of Cyclic Quadrilateral which states that;
"Sum of the angles of opposite side of quadrilateral is always 180°."
So we can say that;
∠ A + ∠ C = 180°
∠ B + ∠ D = 180°
Substituting the values we get;
[tex]\angle A + \angle C = 180\°\\\\90+3x=180\\\\3x=180-90\\\\3x=90\\\\x=\frac{90}{3} = 30[/tex]
Also
[tex]\angle B + \angle D =180\°\\\\2y-3+y+5=180\\\\3y+2=180\\\\3y=180-2\\\\3y=178\\\\y=\frac{178}{3} =59.33[/tex]
Hence The Value of x is 30 and y is 59.33.
