Given: $g(x) = 2^{x - 1}$ and $h(x) = -\frac{6}{x} - 1$ 4.1.1 Write down the equations of the asymptotes of $h$ - NSC Technical Mathematics - Question 4 - 2018 - Paper 1

To find the $x$-intercept, set $h(x) = 0$:

$0 = -\frac{6}{x} - 1$

Rearranging gives:

$\frac{6}{x} = -1 \\ => x = -6.$

Thus the $x$-intercept is $(-6; 0)$.

Graphing both functions involves plotting their key features such as intercepts and asymptotes. For $g(x)$, the $y$-intercept occurs at $g(0) = 2^{-1} = 0.5$. Both functions will intersect the axes, and their asymptotes have been drawn clearly. Make sure to label the axes and provide clear marks for significant points.

Plugging $x = -2$ into $g(x)$:

$g(-2) = 2^{-2 - 1} = 2^{-3} = \frac{1}{8}.$

Since this does not yield $3$, $(-2; 3)$ is not a point on the graph of $g$. Please check calculations or assumptions.

The range of $g(x) = 2^{x-1}$ is $(0, \infty)$ since the exponential function can take any positive value but never reaches zero.

The domain of $h(x) = -\frac{6}{x} - 1$ is all real numbers except $x = 0$, written as:

$x \in (-\infty, 0) \cup (0, \infty).$

The coordinates of $M$ are $(1; 0)$ as derived from the graph provided.

The length of $TR$ can be calculated using the distance formula. Measure the vertical distance from point $T(1; 8)$ to point $R$. The coordinates of $R$ will need to be defined based on intersections with the graph of $g$.

To find the intercepts of $f(x) = a(x + p)^2 + q$, set both $x$ and $y$ values to be zero and solve accordingly. Given that $(0; 6)$ is supposed to be an intercept, substituting into the equation will confirm the relationship.

Expanding $f(x) = -2(x - 1)(x - 3)$:

$f(x) = -2(x^2 - 4x + 3) = -2x^2 + 8x - 6$

confirming the values obtained through intercept calculations.

Given that $K$ is an intercept, substituting $x = -1$ into the function will yield the corresponding $y$, confirming the coordinates at intersection points.

$x$ can be noted as $(-1; 0)$ and utilized in further calculations concerning intersection or verification in algebraic terms.