Answer:
Option (a) is correct.
The standard form the equation [tex]y=2(x+3)^2-5[/tex] is[tex]y=2x^2+12x+13[/tex]
Step-by-step explanation:
Given : the vertex form of the equation of a parabola is [tex]y=2(x+3)^2-5[/tex]
We have to write the given equation in standard form and choose the correct from the given options.
Consider the given equation of parabola [tex]y=2(x+3)^2-5[/tex]
The standard form of equation of parabola is [tex]y=ax^2+bx+c[/tex]
We can obtain the standard form by expanding the square term in the given equation.
Using algebraic identity [tex](a+b)^2=a^2+b^2+2ab[/tex], we have,
[tex]\Rightarrow y=2(x+3)^2-5[/tex]
[tex]\Rightarrow y=2(x^2+3^2+6x)-5[/tex]
Solving brackets, we get,
[tex]\Rightarrow y=2x^2+18+12x-5[/tex]
Simplify, we get,
[tex]\Rightarrow y=2x^2+12x+13[/tex]
Thus, The standard form the equation [tex]y=2(x+3)^2-5[/tex] is[tex]y=2x^2+12x+13[/tex]
