Figure 2 shows a right angled triangle LMN - Edexcel - A-Level Maths Pure - Question 9 - 2014 - Paper 2

Since triangle LMN is a right-angled triangle where LMN = 90°, we can use the property that the product of the gradients of two perpendicular lines is -1.

First, calculate the gradient of line LM:

From the previous calculation, the gradient of LM (denoted as $m_{LM}$) is:

$m_{LM} = -\frac{3}{4}$

Next, we can find the gradient of line MN (denoted as $m_{MN}$) using the coordinates of N(16, p):

$m_{MN} = \frac{p - (-4)}{16 - 7} = \frac{p + 4}{9}$

Setting the product of the gradients to -1:

$m_{LM} \cdot m_{MN} = -1$

Substituting in the gradients:

$-\frac{3}{4} \cdot \frac{p + 4}{9} = -1$

Clearing the negatives and multiplying both sides by -36 (to eliminate fractions):

$3(p + 4) = 36$

Dividing by 3:

$p + 4 = 12$

Thus:

$p = 12 - 4 = 8$

So, the value of p is 8.

Since K needs to form a rectangle with points L, M, and N, the coordinates of K can be determined based on the property that opposite sides must be equal in a rectangle.

Let K have coordinates (x_K, y_K). Since LM is perpendicular to MN, K will share the x-coordinate with M and the y-coordinate with L:

$x_K = 7$ $y_K = 2$

Thus, the coordinates of K are (7, 2). Therefore, the y-coordinate of K is:

$y_K = 2$