If the equations x2+2xy+py2=0 and px2+2xy+y2=0 have one factor exactly in common, then the joint equation of their other two factors will be given by
(correct answer + 1, wrong answer - 0.25)
A
3x2+8xy−3y2=0
No worries! We‘ve got your back. Try BYJU‘S free classes today!
B
3x2+10xy+3y2=0
Right on! Give the BNAT exam to get a 100% scholarship for BYJUS courses
C
y2+2xy−3x2=0
No worries! We‘ve got your back. Try BYJU‘S free classes today!
D
x2+2xy−3y2=0
No worries! We‘ve got your back. Try BYJU‘S free classes today!
Open in App
Solution
The correct option is B3x2+10xy+3y2=0 Let y=mx be a common factor, then pm2+2m+1=0 and m2+2m+p=0 ⇒m22(1−p)=mp2−1=12(1−p) ⇒m2=1 and m=−p+12 ⇒(p+1)2=4 ⇒p=1 or p=−3
But for p=1, the two pairs have both the lines in common.
So, p=−3
Now, x2+2xy+py2=x2+2xy−3y2=(x−y)(x+3y)
and px2+2xy+y2=−3x2+2xy+y2=−(x−y)(3x+y)
∴ Slope m of the line common to both the pairs is 1.
So, joint equation of the required lines is (x+3y)(3x+y)=0 ⇒3x2+10xy+3y2=0