To complete the square, first, we will make the coefficient of x2x2 as 11 Let us convert the equation y=−3(x+1)2−6y=−3(x+1)2−6 from vertex to standard form using the above steps: To convert the vertex to standard form: Expand the square, (x−h)2(x−h)2.Distribute aa.Combine the like terms. We know that the vertex form of parabola is y=a(x−h)2+ky=a(x−h)2+k. How to Convert Vertex Form to Standard Form? This calculator shows you how to convert it into the vertex form with a step-by-step explanation. You can enter the equation of the parabola in the standard form. Here is the “Standard Form to Vertex Form Calculator.” Here, DD is the discriminant where, D=b2−4acD=b2−4ac.
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