Given: Hyperbola
‌−‌=1‌‌ . - - - - - - - (1)
Tangent
:2x−y+1=0−⋅s−−2 or
2x+1=y‌‌⋅s⋅s⋅s⋅s(2) As we know, general form of tangent is
y=mx+c where condition of tangency
⇒c2= a2m2−b2‌‌......(3) From Equation of Hyperbola,
a=a,b=4 And values of
c and
m from the given equation of tangent,
c=1,m=2 ⇒ In Equation
(3),⇒12=a2(2)2−(4)2 ⇒12=4a2−16 ⇒4a2=17⇒a=‌±√17∕2 Now, checking the options with Pythagoras Theorem as they are sides of right angled triangle,
C)
2a,4,1⇒√17,4,1⇒√17>√16⇒√17>4 So,
√17 is the bigger side.
By Pythagoras theorem,
(1)2+(4)2=(√17)2 1+16=17 It is a correct set.
D)
2a,8,1 8>√17⇒8 is bigger side.
⇒64=(√17)2+(1)2 ⇒64≠17+1 So, they cannot be sides of the triangle.
B)
a,4,1 4>‌⇒4 is the biggest side.
16=‌+1 16≠‌ They cannot be sides of a right angled triangle.
A)
a,4,2 4>‌ 42=(‌)2+(2)2=‌+4 ⇒16≠‌ They cannot be sides of a right angled triangle.