### Golden Thoughts

Rectangle PQRS has X and Y on the edges. Triangles PQY, YRX and XSP have equal areas. Prove X and Y divide the sides of PQRS in the golden ratio.

### From All Corners

Straight lines are drawn from each corner of a square to the mid points of the opposite sides. Express the area of the octagon that is formed at the centre as a fraction of the area of the square.

### Star Gazing

Find the ratio of the outer shaded area to the inner area for a six pointed star and an eight pointed star.

# Mixing More Paints

##### Age 14 to 16 Challenge Level:

This problem follows on from Mixing Paints.

A decorator can buy blue paint from two manufacturers.

• Paint A is made up from dark blue and white paint in the ratio $1:4$
• Paint B is made up from dark blue and white paint in the ratio $1:5$

She can mix the paints to produce different shades of blue.

What is the least number she would need of each type in order to produce blue paint containing dark blue and white in the following ratios:

$2:9$
$3:14$
$10:43$

You may wish to experiment with the interactivity below.

Another decorator buys blue paint from two different manufacturers:
• Paint C is made up from dark blue and white paint in the ratio $1:3$
• Paint D is made up from dark blue and white paint in the ratio $1:7$
What is the least number she would need of each type in order to produce blue paint containing dark blue and white in the following ratios:

$2:9$
$3:14$
$10:43$

Is it always possible to combine two paints made up in the ratios $1:x$ and $1:y$ and turn them into paint made up in the ratio $a:b$ ? Experiment with a few more examples.

Can you describe an efficient way of doing this?