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Question
By shifting origin to a suitable point with out rotation of axes, the equation xy−x+2y=6 has transformed to XY=B, then the value of B is
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Solution
Let the new origin be (h,k)
∴x=X+h,y=Y+k
Original equation: xy−x+2y=6
⇒(X+h)(Y+k)−(X+h)+2(Y+k)=6
⇒XY+kX+hY+hk−X−h+2Y+2k=6
⇒XY+(k−1)X+(h+2)Y=6−hk+h−2k
Comparing with XY=B, we get
k−1=0,h+2=0 and B=6−hk+h−2k
⇒k=1,h=−2
∴B=6+2−2−2=4
∴x=X+h,y=Y+k
Original equation: xy−x+2y=6
⇒(X+h)(Y+k)−(X+h)+2(Y+k)=6
⇒XY+kX+hY+hk−X−h+2Y+2k=6
⇒XY+(k−1)X+(h+2)Y=6−hk+h−2k
Comparing with XY=B, we get
k−1=0,h+2=0 and B=6−hk+h−2k
⇒k=1,h=−2
∴B=6+2−2−2=4
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