Consider the hyperbola `(X^(2))/(9)-(y^(2))/(a^(2))=1` and the circle `x^(2)+(y-3)=9`. Also, the given hyperbola and the ellipse `(x^(2))/(41)+(y^(2))/(16)=1` are orthogonal to each other. The number of points on the hyperbola and the circle from which tangents drawn to the circle and the hyperbola, respectively, are perpendicular to each other is

Consider the hyperbola `(X^(2))/(9)-(y^(2))/(a^(2))=1` and the circle

1.	Consider the hyperbola `(X^(2))/(9)-(y^(2))/(a^(2))=1` and the circle `x^(2)+(y-3)=9`. Also, the given hyperbola and the ellipse `(x^(2))/(41)+(y^(2))/(16)=1` are orthogonal to each other. The number of points on the hyperbola and the circle from which tangents drawn to the circle and the hyperbola, respectively, are perpendicular to each other is
Answer» Correct Answer - C Ellipse and hyperbola are orthogonal and therefore, they are confocal. `"So, "a_(h)e_(h)=a_(e)e_(e)` `rArr" "a^(2)+9=41-16` `rArr" "9+a^(2)=25` `rArr" "a^(2)=16` Thus, hyperbola is `(x^(2))/(9)-(y^(2))/(16)=1.` So, common tangents to the circle and hyperbola are `x = pm 3`. Director circle of hyperbola does not exist as `a lt b.` Director circle of circle is `x^(2)+(y-3)^(2)=18` `rArr" "x^(2)+y^(2)-6y-9=0` This meets the hyperbola `16x^(2)-9y^(2)=144` at four points from where tangents drawn to the circle `x^(2)+(y-3)^(2)=9` are perpendicular to each other. Let midpoint of AB be (h,k). So, equation of line AB is `hx+ky-3(y+k)=h^(2)+k^(2)-6k`. Since tangents at C and D intersect at the directrix, CD is the focal chord of hyperbola. So, AB passes through focus of the hyperbola and that is `(pm5,0)`. Therefore, required lacus is `x^(2)+y^(2)pm5x-3y=0`.

Discussion

No Comment Found

Related InterviewSolutions

If `4(x-sqrt2)^(2)+lambda(y-sqrt3)^(2)=45 and (x-sqrt2)^(2)-4(y-sqrt3)^(2)=5` cut orthogonally, then integral value of `lambda` is ________.
Suppose the circle having equation `x^2+y^2=3`intersects the rectangular hyperbola `x y=1`at points `A ,B ,C ,a n dDdot`The equation `x^2+y^2-3+lambda(x y-1)=0,lambda in R ,`represents.a pair of lines through the origin for `lambda=-3`an ellipse through `A ,B ,C ,a n dD`for `lambda=-3`a parabola through `A , B , C ,a n dD`for `lambda=-3`a circle for any `lambda in R`A. a pair of lines through the origin for `lambda=-3`B. an ellipse through A, B, C and D for `lambda=-3`C. a parabola through A, B, C and D for `lambda=-3`D. a circle for any `lambda in R`
The equation of that chord of hyperbola `25x^(2)-16y = 400`, whose mid point is (5,3) isA. `115x - 117y = 17`B. `125x - 48y = 481`C. `127x + 33y = 341`D. `15x - 121y = 105`
The equation of the chord joining two points `(x_(1),y_(1))` and `(x_(2),y_(2))` on the rectangular hyperbola `xy=c^(2)`, isA. `(x)/(x_(1)+x_(2))+(y)/(y_(1)+y_(2))=1`B. `(x)/(x_(1)-x_(2))+(y)/(y_(1)-y_(2))=1`C. `(x)/(y_(1)+y_(2))+(y)/(x_(1)+x_(2))=1`D. `(x)/(y_(1)-y_(2))+(y)/(x_(1)-x_(2))=1`
If the chord joining the points `(a sectheta_1, b tantheta_1)` and `(a sectheta_2, b tantheta_2)` on the hyperbola `x^2/a^2-y^2/b^2=1` is a focal chord, then prove that `tan(theta_1/2)tan(theta_2/2)+(ke-1)/(ke+1)=0`, where `k=+-1`A. `(1-e)/(1+e)`B. `(e-1)/(e+1)`C. `(e+1)/(e-1)`D. `(1+e)/(1-e)`
If a chord joining `P(a sec theta, a tan theta), Q(a sec alpha, a tan alpha)` on the hyperbola `x^(2)-y^(2) =a^(2)` is the normal at P, then `tan alpha =`A. `tan theta (4 sec^(2) theta+1)`B. `tan theta (4 sec^(2) theta -1)`C. `tan theta (2 sec^(2) theta -1)`D. `tan theta (1-2 sec^(2) theta)`
Prove that any hyperbola and its conjugate hyperbola cannot have common normal.
The number of normal (s) of a rectangular hyperbola which can touch its conjugate is equal to
Normal are drawn to the hyperbola `(x^2)/(a^2)-(y^2)/(b^2)=1`at point `theta_1a n dtheta_2`meeting the conjugate axis at `G_1a n dG_2,`respectively. If `theta_1+theta_2=pi/2,`prove that `C G_1dotC G_2=(a^2e^4)/(e^2-1)`, where `C`is the center of the hyperbola and `e`is the eccentricity.
There exist two points `P` and `Q` on the hyperbola `(x^(2))/(a^(2))-(y^(2))/(b^(2))=1` such that `PObotOQ`, where `O` is the origin, then the number of points in the `xy`-plane from where pair of perpendicular tangents can be drawn to the hyperbola , isA. `0`B. `1`C. `2`D. infinite

Discussion

No Comment Found

Related InterviewSolutions

Reply to Comment