Step-by-step explanation:
The vertex is obviously at the origin, but I need to "show" this "algebraically" by rearranging the given equation into the conics form:
x2 = 4y Copyright Β© Elizabeth Stapel 2010-2011 All Rights Reserved
(x β 0)2 = 4(y β 0)
This rearrangement "shows" that the vertex is at (h, k) = (0, 0). The axis of symmetry is the vertical line right through the vertex: x = 0. (I can always check my graph, if I'm not sure about this.) The focus is "p" units from the vertex. Since the focus is "inside" the parabola and since this is a "right side up" graph, the focus has to be above the vertex.
From the conics form of the equation, shown above, I look at what's multiplied on the unsquared part and see that 4p = 4, so p = 1. Then the focus is one unit above the vertex, at (0, 1), and the directrix is the horizontal line y = β1, one unit below the vertex.
vertex: (0, 0); focus: (0, 1); axis of symmetry: x = 0; directrix: y = β1
Graph y2 + 10y + x + 25 = 0, and state the vertex, focus, axis of symmetry, and directrix.
Since the y is squared in this equation, rather than the x, then this is a "sideways" parabola. To graph, I'll do my T-chart backwards, picking y-values first and then finding the corresponding x-values for x = βy2 β 10y β 25:
To convert the equation into conics form and find the exact vertex, etc, I'll need to convert the equation to perfect-square form. In this case, the squared side is already a perfect square, so:
y2 + 10y + 25 = βx
(y + 5)2 = β1(x β 0)
This tells me that 4p = β1, so p = β1/4. Since the parabola opens to the left, then the focus is 1/4 units to the left of the vertex. I can see from the equation above that the vertex is at (h, k) = (0, β5), so then the focus must be at (β1/4, β5). The parabola is sideways, so the axis of symmetry is, too. The directrix, being perpendicular to the axis of symmetry, is then vertical, and is 1/4 units to the right of the vertex. Putting this all together, I get:
vertex: (0, β5); focus: (β1/4, β5); axis of symmetry: y = β5; directrix: x = 1/4
Find the vertex and focus of y2 + 6y + 12x β 15 = 0
The y part is squared, so this is a sideways parabola. I'll get the y stuff by itself on one side of the equation, and then complete the square to convert this to conics form.
y2 + 6y β 15 = β12x
y2 + 6y + 9 β 15 = β12x + 9
(y + 3)2 β 15 = β12x + 9
(y + 3)2 = β12x + 9 + 15 = β12x + 24
(y + 3)2 = β12(x β 2)
(y β (β3))2 = 4(β3)(x β 2)
Then the vertex is at (h, k) = (2, β3) and the value of p is β3. Since y is squared and p is negative, then this is a sideways parabola that opens to the left. This puts the focus 3 units to the left of the vertex.
