461,964 views
39 votes
39 votes
Consider the equation. Determine whether the graph of the equation opens upward or downward.

Consider the equation. Determine whether the graph of the equation opens upward or-example-1
User Forage
by
3.2k points

1 Answer

15 votes
15 votes

\begin{gathered} y=(1)/(4)(x-5)^2-3 \\ (x-5)^2=x^2+2(x)(-5)+(-5)^2 \\ (x-5)^2=x^2-10x+25 \\ Hence \\ y=(1)/(4)(x^2-10x+25)^{}-3 \\ y=(1)/(4)x^2-(10x)/(4)+(25)/(4)^{}-3 \\ y=(1)/(4)x^2-(10x)/(4)+(13)/(4)^{} \\ if\text{ a>0, it opens up, in this case a=}(1)/(4),\text{ and }(1)/(4)>0,\text{ therefore the equation opens upward} \\ \\ \text{Questions 2} \\ y=2(x-5)^2-3 \\ y=2(x^2-10x+25)-3 \\ y=2x^2-20x+50-3 \\ y=2x^2-20x+47 \\ (1)/(4)<2,\text{ then} \\ \text{The graph of the equation is wider} \end{gathered}

Consider the equation. Determine whether the graph of the equation opens upward or-example-1
Consider the equation. Determine whether the graph of the equation opens upward or-example-2
User Nauman Khalid
by
2.8k points