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Conic Hyperbola (1 Viewer)
- Thread starter OLDMAN
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Ah my teacher used this question as an example when we did hyperbolas.
let A and B be the points of intersection of tangent and the asymptotes.
eqn of tangent to hyperbola at P(asec@, btan@):
xsec@/a - ytan@/b = 1 ...[1]
eqn's of asymptotes:
y = +-bx/a
sub y = bx/a into [1]:
xsec@/a - atan@/a = 1
x[(sec@ - tan@)/a] = 1
x = a/(sec@ - tan@)
similarly upon subbing x = ay/b into [1]:
y = b/(sex@ - tan@)
.'. A[a/(sec@ - tan@), b/(sec@ - tan@)]
subbing y = -bx/a and x = -ay/b gets B[a/(sec@ + tan@), -b/(sec@ + tan@)]
let C be the point of intersection of the tengent with the x axis.
subbing y = 0 into [1] gives:
x = a/sec@
.'. C(a/sec@, 0)
Now area of /\OAB = area /\OAC + area /\OBC
area /\OAC = ab/2sec@(sec@ - tan@) (using 1/2*base*height rule)
area /\ABC = ab/2sec@(sec@ + tan@)
so area /\OAB = ab/2sec@(sec@ - tan@) + ab/2sec@(sec@ - tan@)
= ab/2sec@[1/(sec@ - tan@) + 1/(sec@ + tan@)]
= ab/2sec@[2sec@/((sec@)^2 - (tan@)^2)]
= ab/((sec@)^2 - (tan@)^2)
= ab
let A and B be the points of intersection of tangent and the asymptotes.
eqn of tangent to hyperbola at P(asec@, btan@):
xsec@/a - ytan@/b = 1 ...[1]
eqn's of asymptotes:
y = +-bx/a
sub y = bx/a into [1]:
xsec@/a - atan@/a = 1
x[(sec@ - tan@)/a] = 1
x = a/(sec@ - tan@)
similarly upon subbing x = ay/b into [1]:
y = b/(sex@ - tan@)
.'. A[a/(sec@ - tan@), b/(sec@ - tan@)]
subbing y = -bx/a and x = -ay/b gets B[a/(sec@ + tan@), -b/(sec@ + tan@)]
let C be the point of intersection of the tengent with the x axis.
subbing y = 0 into [1] gives:
x = a/sec@
.'. C(a/sec@, 0)
Now area of /\OAB = area /\OAC + area /\OBC
area /\OAC = ab/2sec@(sec@ - tan@) (using 1/2*base*height rule)
area /\ABC = ab/2sec@(sec@ + tan@)
so area /\OAB = ab/2sec@(sec@ - tan@) + ab/2sec@(sec@ - tan@)
= ab/2sec@[1/(sec@ - tan@) + 1/(sec@ + tan@)]
= ab/2sec@[2sec@/((sec@)^2 - (tan@)^2)]
= ab/((sec@)^2 - (tan@)^2)
= ab
underthesun
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hey.., in exam situations, are you required to deduce the tangent equations?
and, it seems that my way requires using the distance formula..
is there a better method than this?
edit: I see the answer now. seems i posted a bit too late..
edit: indeed elegant
and, it seems that my way requires using the distance formula..
is there a better method than this?
edit: I see the answer now. seems i posted a bit too late..
edit: indeed elegant
Last edited:
The question was not posted like an exam question. If this q was in the exam, there would be a few leading questions- it is amazing how the examiner leads you by the hand. Perhaps part i) might be : show that eqn. of tangent is xsec@/a-ytan@/@=1;
part ii) show equation of the asymptotes;
part iii) might be: hence find that the area of the triangle formed by the tangent, the asymptote and the x axis is
part ii) show equation of the asymptotes;
part iii) might be: hence find that the area of the triangle formed by the tangent, the asymptote and the x axis is
underthesun
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- Joined
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- HSC
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oh i see.. thanks.