The diagram shows a triangle, ABC, with perpendicular height BD - OCR - GCSE Maths - Question 14 - 2023 - Paper 5

To find the length of BD, we can use trigonometric ratios.

1. First, identify angle BDA, which is $45^ ext{°}$. Since triangle ABD is a right triangle, we can apply the tangent function: $\tan(45^ ext{°}) = \frac{BD}{AD}$ From this, we know that $AD = BD$ since $\tan(45^ ext{°}) = 1$.

2. Now, move on to triangle BCD, where we know angle BCD is $30^ ext{°}$ and BC = 12 cm. Using the sine function, we have: $\sin(30^ ext{°}) = \frac{BD}{BC}$ Thus: $\frac{1}{2} = \frac{BD}{12}$ Therefore, we can rearrange it to find BD: $BD = 12 \times \frac{1}{2} = 6 ext{ cm}.$

So, the length of BD is 6 cm.