Given: G = \sqrt{\frac{p + 1}{2p - 1}} Determine the value(s) of $p$ such that $G$ will be as follows: 2.1.1 Undefined 2.1.2 Equal to zero 2.2 Determine for which value(s) of $k$ the equation $x^2 - k + 4 = 5x$ will have real roots. - NSC Technical Mathematics - Question 2 - 2019 - Paper 1

To find when $G$ equals zero, we need the numerator to be zero: $p + 1 = 0$ Solving for $p$ gives: $p = -1$ Thus, $G$ is equal to zero when $p = -1.$

First, we rearrange the equation to standard form: $x^2 - 5x + (4 - k) = 0$

Next, we need to find the discriminant $b^2 - 4ac$ to determine when the equation has real roots. For the quadratic equation $ax^2 + bx + c$, we have:

• $a = 1$
• $b = -5$
• $c = 4 - k$

Calculating the discriminant: $( -5)^2 - 4(1)(4 - k) \geq 0$ $25 - 4(4 - k) \geq 0$ $25 - 16 + 4k \geq 0$ $4k + 9 \geq 0$ Thus, $4k \geq -9$ or: $k \geq -\frac{9}{4}$ Hence, the equation will have real roots when $k \geq -\frac{9}{4}$.