Let Y= f(x) and Y=g(x) be the pair of curves such that ( i ) the tangents at point with equal abcissae intersect on y-axis. ( ii ) the normals at point with equal abcissae intersect at x-axis. ( iii ) one curve passes through (1,1) and the other one p
Question asked by: NITIKA
Asked on: 16 Jan 2010
This sounds like it might be a bit specialised for someone to answer, can you say how to go about solving this sort of question?
I mean should you draw the two graphs on graph paper and then see how they relate to one another... what are the maths techniques that can be used to help work out the answer and help solve this sort of question?
By: knowitall
Replied at: 17 Jan 2010
Average rating for this answer is 5 / 5
Rate Answer
No comments have been added to this question "Let Y= f(x) and Y=g(x) be the pair of curves such that ( i ) the tangents at point with equal abcissae intersect on y-axis. ( ii ) the normals at point with equal abcissae intersect at x-axis. ( iii ) one curve passes through (1,1) and the other one p".
Ask a New Question
Find out more about Maths
Maths Questions and Answers maths exam questions Questions and Answers Next question: equations
Become a Member! It's Free >>>
Share on Facebook: 
On Twitter:
Tweet this!
Question Keywords
abcissae intersect equal point xaxis iii normals
More Questions:Decimals
Algebra Question & Answer
Find The Equation Of Each Parabola F With The Following Characteristics:
A) The Points P1 (-1/11), P2 (0 / 5) And P3 (2 / 5) Lie On The Graph Of F.
B) S (1 / 2) Is The Vertex Of F, P (2 / 5) Is Another Point Of F.
C) The Graph Of F Intersects The X-axi
I Need To Understand The Rearrangement Of An Algebraic Expression
If P(x)=1+15x And Q(x)=5x +9x Then Find 9p(x)+25q(x) And Hence Factorize