A locus cannot be defined unless we have a relationship between p and q (in this case)Ok I'm stuck again... I'm terrible at this =.=
It's the next part of that question. It says:
By evaluating the espression x^2 = 4ay at T (which is pt of intersection I found is (a(p+q),apq)), or otherwise, find the locus of T when the tangents at P and Q intersect.
I tried using x=a(p+q), y=apq as parametric equations but I'm not getting the right answer
Please help
There should really be absolute value signs around that:
Thanks it's really helpedThere should really be absolute value signs around that:* (unless some other condition is placed on p and q), because the angle between two lines takes the absolute value:
Note how now the expression is symmetric in p and q, i.e., they can be exchanged without changing the relation. (|p – q| = |q – p|)
Now, we need to eliminate p and q from
using
absolute value signs are generally an indication to square, after which we can use ** to insert x
^2 &= \left (1 + pq \right )^2\\p^2 - 2pq + q^2 &= 1 + 2pq + \left (pq \right )^2\\p^2 + 2pq + q^2 - 4pq &= 1 + 2pq + \left (pq \right )^2\\\left ( p + q \right )^2 &= 1 + 6pq + \left (pq \right )^2\\\left ( a(p + q) \right )^2 &= a^2 + 6a \cdot apq + \left (apq \right )^2 &&&\text{after } \times a^2\\x^2 &= y^2 + 6ay + a^2\end{align*})
