• Congratulations to the Class of 2024 on your results!
    Let us know how you went here
    Got a question about your uni preferences? Ask us here

conics (1 Viewer)

nrumble42

Member
Joined
Oct 3, 2016
Messages
64
Gender
Female
HSC
2017
so i have two tangents, and I have to find the point of intersection but i cant get anywhere when i do it

tangents:
y(3cosx)-x(2sinx)=6 and y(3sinx) +x(2cosx)=6
 

InteGrand

Well-Known Member
Joined
Dec 11, 2014
Messages
6,109
Gender
Male
HSC
N/A
so i have two tangents, and I have to find the point of intersection but i cant get anywhere when i do it

tangents:
y(3cosx)-x(2sinx)=6 and y(3sinx) +x(2cosx)=6
Are you sure those should be cos(x) and sin(x) instead of something like cos(theta) and sin(theta)? They wouldn't be straight lines as you've written them.
 

InteGrand

Well-Known Member
Joined
Dec 11, 2014
Messages
6,109
Gender
Male
HSC
N/A
Now that those are cos(theta) etc., all you need to do is find the intersection of two lines. This can be done by solving for x in one of the lines (in terms of y), and plugging this into the other line's equation (i.e. standard procedure of solving two simultaneous linear equations in two unknowns).
 

pikachu975

Premium Member
Joined
May 31, 2015
Messages
2,739
Location
NSW
Gender
Male
HSC
2017
so i have two tangents, and I have to find the point of intersection but i cant get anywhere when i do it

tangents:
y(3cosx)-x(2sinx)=6 and y(3sinx) +x(2cosx)=6
Rearranging first tangent equation for x in terms of y:
3ycosA - 2xsinA = 6
2xsinA = 3ycosA - 6
x = 3(ycosA - 2)/2sinA

Sub this into second equation
3ysinA + 2xcosA = 6
3ysinA + 3cosA(ycosA-2)/sinA = 6
3ysin^2 A + 3ycos^2 A - 6cosA = 6sinA
3y (sin^2 A + cos^2 A) = 6(sinA + cosA)
y = 2(sinA+cosA)

Sub y into the first tangent equation
6cosA(sinA+cosA) - 2xsinA = 6
6sinAcosA + 6cos^2 A - 2xsinA = 6
6sinAcosA + 6 - 6sin^2 A - 2xsinA = 6
6sinAcosA - 6sin^2 A = 2xsinA
3cosA - 3sinA = x (sinA doesn't = 0)
x = 3(cosA-sinA)

Therefore they intersect at x = 3(cosA-sinA), y = 2(sinA+cosA)
 

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top