ecc30b…: “Up to the happy square”

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Complete the square to write $3x^2 - 4x - 5$ in vertex form.

$3x^2 - 4x - 5$ is in standard form, therefore

a = $\answer {3}$
b = $\answer {-4}$
c = $\answer {-5}$

$a \ne 1$, so let’s factor it out of the quadratic and linear terms.

\[ 3x^2 - 4x - 5 = 3 \left ( x^2 - \frac {4}{3} x \right ) - 5 \]

Refocus:

Now, we are just focusing on the quadratic inside the parentheses. It doesn’t have a constant term. The $-5$ will just float around outside the parentheses for a moment.

Our inside quadratic is $x^2 - \frac {4}{3} x$ or $x^2 - \frac {4}{3} x + 0$.

a = $\answer {1}$
b = $\answer {-\frac {4}{3}}$
c = $\answer {0}$

This makes $\frac {b}{2} = \answer {-\frac {4}{6}}$, and its square is $\left ( \frac {b}{2} \right )^2 = \answer {\frac {16}{36}}$, which is added and subtracted to the expression. That way we have only add $0$ to the expression and not changed any values.

\[ x^2 - \frac {4}{3} x + \answer {\frac {16}{36}} - \answer {\frac {16}{36}} \]

The “added” number is grouped together with the quadratic and linear terms to form a perfect square.

\[ \left ( x^2 - \frac {4}{6} \right )^2 - \answer {\frac {16}{36}} \]

We might as well simplify our fractions.

\[ \left ( x^2 - \frac {2}{3} \right )^2 - \answer {\frac {4}{9}} \]

That was happening inside the parentheses, so let’s replace the old inside with the new inside.

\[ 3 \left ( \left ( x^2 - \frac {2}{3} \right )^2 - \answer {\frac {4}{9}} \right ) - 5 \]

Distribute and combine the constant terms.

\[ 3 \left ( x^2 - \frac {2}{3} \right )^2 - 3 \cdot \answer {\frac {4}{9}} - 5 \]

\[ 3 \left ( x^2 - \frac {2}{3} \right )^2 - \answer {\frac {4}{3}} - 5 \]

\[ 3 \left ( x^2 - \frac {2}{3} \right )^2 - \frac {19}{3} \]

2025-01-07 02:37:39