The equation of a parabola is given. #y=−16x^2+7x−80# What is the equation of the directrix of the parabola? Enter your answer in the box.

1 Answer
May 24, 2018

#y = -5#

Explanation:

When given the equation of a parabola in the form,

#y=ax^2+bx+c#

, the #x# coordinate of the vertex, #h#, can be found using the formula:

#h = -b/(2a)#

The #y# coordinate of the vertex, #k#, is found by evaluating the function at #h#:

#k = a(h)^2+b(h)+c#

The focal distance, #f#, can be found, using the formula:

#f = 1/(4(a))#

The equation of the directrix can be found, using the form:

#y = k-f#

Given: #y=−1/6x^2+7x−80#

Please observe that #a = -1/6 and b = 7#, therefore, the #x# coordinate of the vertex is:

#h = -7/(2(-1/6)) = 42/2#

#h = 21#

The #y# coordinate, #k#, of the vertex can be found by evaluating the function at #21#:

#k = -1/6(21)^2+7(21)-80#

#k = -13/2#

The focal distance f is:

#f=1/(4(-1/6))= -6/4#

#f = -3/2#

The equation of the directrix is:

#y = -13/2 - -3/2 = (-13+3)/2 = -10/2#

#y = -5#