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The equation in vertex form π = π^2 find the Coordinates of vertexAsked by hala aly
equation in
vertex formπ = ππ^π + 4 find the Coordinates of
vertex
vertex formπ = ππ^π + 4 find the Coordinates of
vertex
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To find the vertex of an equation in vertex form, we simply need to look at the values of h and k.
π = π(π - π)^2 + π
In this equation, π represents the x-coordinate of the vertex, and π represents the y-coordinate of the vertex.
Comparing this to the equation given:
π = ππ^π + 4
We can see that π = 0 (since there is no x-term in the equation), and π = 4.
Therefore, the coordinates of the vertex are:
(π, π) = (0, 4)
π = π(π - π)^2 + π
In this equation, π represents the x-coordinate of the vertex, and π represents the y-coordinate of the vertex.
Comparing this to the equation given:
π = ππ^π + 4
We can see that π = 0 (since there is no x-term in the equation), and π = 4.
Therefore, the coordinates of the vertex are:
(π, π) = (0, 4)