What are steps to answer this question ?

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1 Answer
Nov 7, 2017

#-1 < h < 7#

Explanation:

Since the #x^2# term of the quadratic has a positive coefficient we know the parabola is of the #uuu# form.

From the discriminant we know that if:

#sqrt(b^2-4ac)=0# the parabola turns at the x axis, resulting in there being one value for which y = 0.

If:

#sqrt(b^2-4ac)>0# the parabola will cross the x axis resulting in there being values of x such that y < 0.

But if:

#sqrt(b^2-4ac)<0# then the parabola will be above the x axis and so the function will be greater than zero for all values of x. This is therefore what we need to solve to find the required values of h.

#b^2 = (h-3)^2#

#:.#

#(h-3)^2-4(1)(4)<0#

#h^2-6h-7=0#

Factoring:

#(h-7)(h+1)=0=> h=7 , h= -1#

These are the boundary points. We are looking for values less than zero, so these will be when:

#h<7# and #h> -1#

Hence:

#-1 < h < 7#