Answer:
Focus = (0, [tex]\frac{3}{4}[/tex])
Step-by-step explanation:
(± 3, 3) are at an equal distance from y-axis.
axis of parabola = y-axis
vertex = (0, 0)
Parabola will be of the form: x² = 4ay, passing through(± 3, 3)
(± 3)² = 4 × a × 3 ⇒ 9 = 12a ⇒ a = [tex]\frac{9}{12}[/tex]
a = [tex]\frac{3}{4}[/tex]
Coordinates of focus are: (0, a) ⇒ (0, [tex]\frac{3}{4}[/tex])
Answer:
The focus of the parabola is (0 , 3/4)
Step-by-step explanation:
* Lets revise some facts about the parabola
- The standard form of the equation of a parabola of vertex (h , k)
is (x - h)² = 4p (y - k)
- The standard form of the equation of a parabola of vertex (0 , 0) is
x² = 4p y, from this equation we can find:
# The axis of symmetry is the y-axis, x = 0
# 4p equal to the coefficient of y in the given equation
# If p > 0, the parabola opens up.
# If p < 0, the parabola opens down.
# The coordinates of the focus, (0 , p)
# The directrix , y = − p
* Now lets solve the problem
∵ The vertex of the parabola is (0 , 0)
∴ The equation of the parabola is x² = 4p y
∵ the parabola passes through points (-3 , 3) and (3 , 3)
- Substitute the value of x and y coordinates of one point in the
equation to find the value of p
∴ (3)² = 4p (3) ⇒ we use point (3 , 3)
∴ 9 = 12 p ⇒ divide both sides by 12
∴ p = 9/12 = 3/4
- Now lets find the focus of the parabola
∵ The focus of the parabola is (0 , p)
∵ p = 3/4
∴ The focus of the parabola is (0 , 3/4)
