MedVision ad

Maths adv question (1 Viewer)

safal.regmi

New Member
Joined
Mar 5, 2022
Messages
14
Gender
Male
HSC
2023
This appeared in my trial paper and I still have no idea how to do it, can someone please explain how to do it?
 

Attachments

safal.regmi

New Member
Joined
Mar 5, 2022
Messages
14
Gender
Male
HSC
2023
Please tell me its actually hard, istg if this is supposed to be easy 😭
 

Luukas.2

Well-Known Member
Joined
Sep 21, 2023
Messages
444
Gender
Male
HSC
2023
Any line through the origin has equation for some value of .

This line intersects the curve when .

If the line is a tangent, then the quadratic will have only one solution, and so the discriminant is zero. Thus:


and so the two tangents are and .
 

DoubleDashMan_og

New Member
Joined
Oct 14, 2023
Messages
2
Gender
Male
HSC
2023
Ok, so like i'm late to the thread but anyway have a look :)

so like y=mx+b but the b is zero since the line goes through the origin.

and... this line touches y = x^2+3x+5 twice it's a little cheeky...

so I equate the y's ;

As such, mx=x^2+3x+5

solve for x , 0 = x^2 +x(3-m) + 5

quadratic formula to solve for x but the trick is that the discriminant i.e sqrt(b^2-4ac) = 0 because it's cheeky i.e only touches once

then a wee bit of algebra --> (3-m)^2-4x1x5=0

m= 3+2sqr(5), 3-2sqrt(5)

and then sub into y=mx

Alternative;

dy/dx = 2x+3

dy/dx = m

m=2x+3

mx=x^2+3x+5

sub; (2x+3)=x^2+3x+5

x^2=5

x=+-sqrt(5)

... (therefore soz idk how to do the normal therefore dots) y = +-2sqrt(5)+3 i.e sub x into m=2x+3

soz for weird format lmao
 
Last edited:

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

Top