I don't understand what this question is asking me to do if someone could explain that would be greatly appreciated!! Find the maximum value for the following quadratic equation...?
f(x) = x - 2x2 - 1
f(x) = x - 2x2 - 1
1 Answer
Explanation:
#"to determine the maximum/minimum value we"#
#"require the coordinates of the vertex"#
#"given a quadratic equation in "color(blue)"standard form"#
#•color(white)(x)y=ax^2+bx+c color(white)(x);a!=0#
#"then the x-coordinate of the vertex is"#
#x_(color(red)"vertex")=-b/(2a)#
#"rearrange "y=x-2x^2-1" into standard form"#
#rArry=-2x^2+x-1larrcolor(blue)"in standard form"#
#"with "a=-2,b=1" and "c=-1#
#rArrx_(color(red)"vertex")=-1/(-4)=1/4#
#"substitute this value into the equation for y"#
#y_(color(red)"vertex")=-2(1/4)^2+1/4-1#
#color(white)(xxxxxxxxxx)=-1/8+2/8-8/8=-7/8#
#rArrcolor(magenta)"vertex "=(1/4,-7/8)#
#"to determine maximum/minimum consider the sign"#
#"of a the coefficient of the "x^2" term"#
#• " if "a>0" then y is a minimum"#
#• "if "a<0" then y is a maximum"#
#"here "a=-2<0" hence y is a maximum"#
#rArr"maximum value is "y=-7/8#
graph{-2x^2+x-1 [-10, 10, -5, 5]}
