1. Use the given information to determine the equation of each quadratic relation in vertex form, $y = a (x - h)^{2} + k$ .
a) $a = 2$ , vertex at $(0, 3)$

Answer

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Answer

Final Answer: The equation of the quadratic relation in vertex form is $y = 2 (x - 0)^{2} + 3$ , which simplifies to $y = 2 x^{2} + 3$ .

Steps

Step 1 ：Use the given information to determine the equation of each quadratic relation in vertex form, $y = a (x - h)^{2} + k$ .

Step 2 ：a) $a = 2$ , vertex at $(0, 3)$

Step 3 ：We are given the value of $a$ and the vertex coordinates $(h, k)$ . We can plug these values into the vertex form equation to find the equation of the quadratic relation.

Step 4 ：Final Answer: The equation of the quadratic relation in vertex form is $y = 2 (x - 0)^{2} + 3$ , which simplifies to $y = 2 x^{2} + 3$ .

1. Use the given information to determine the equation of each quadratic relation in vertex form, y=a(x−h)2+k.a) a=2, vertex at (0,3)

Answer

Popular Problems

1. Use the given information to determine the equation of each quadratic relation in vertex form, $y = a (x - h)^{2} + k$ .
a) $a = 2$ , vertex at $(0, 3)$