The table below shows the monthly income (in rands) of 6 different people and the amount (in rands) that each person spends on the monthly repayment of a motor vehicle - NSC Mathematics - Question 1 - 2019 - Paper 2

Using the regression equation:

$y = -1946.88 + 0.41(14000)$

Calculating the repayment:

$y = -1946.88 + 5740 = R3 727.16$

Thus, the predicted monthly repayment is approximately R3 727.16.

The correlation coefficient $r$ can be computed using:

$r = \frac{n(\sum xy) - (\sum x)(\sum y)}{\sqrt{[n(\sum x^2) - (\sum x)^2][n(\sum y^2) - (\sum y)^2]}}$

After calculating, we find:

$r = 0.946$

This indicates a strong positive correlation between monthly income and repayment.

Based on the interpretation of the correlation and position relative to the regression line,

• Option D is the most logical choice.
• NOT to spend R9 000 per month because the point (18 000 ; 9 000) lies very far from the least squares regression line.