Figure 3 shows a sketch of the curve C with parametric equations x = 4 overline{cos} igg( t + rac{ ext{π}}{6} igg), y = 2 ext{sint}, ext{where } 0 < t < 2 ext{π} - Edexcel - A-Level Maths Pure - Question 2 - 2014 - Paper 8

To prove that $x + y = 2 ext{√3 cos t}$, we first express $x$ and $y$ using the given parametric equations:

x = 4 ext{cos}igg(t + rac{ ext{π}}{6}igg) $y = 2 ext{sint}$

Next, we expand the cosine term using the angle addition formula:

x = 4igg( ext{cos}igg(t + rac{ ext{π}}{6}igg) = ext{cos}(t) ext{cos}igg(rac{ ext{π}}{6}igg) - ext{sin}(t) ext{sin}igg(rac{ ext{π}}{6}igg)\ Using known values, we find:

ext{cos}igg(rac{ ext{π}}{6}igg) = rac{ ext{√3}}{2} ext{ and } ext{sin}igg(rac{ ext{π}}{6}igg) = rac{1}{2}

This simplifies to:

x = 4igg( ext{cos}(t)rac{ ext{√3}}{2} - ext{sin}(t)rac{1}{2}igg)\ Then, x = 2 ext{√3 cos t} - 2 ext{sin t}$$

Now, we substitute this expression for $x$ into the equation $x + y$:

x + y = 2 ext{√3 cos t} - 2 ext{sin t} + 2 ext{sin t}\ This results in: $x + y = 2 ext{√3 cos t}$

Thus, we have shown the required relationship.