Sign Analysis of Functions: Solved Problems

\[ f(x) > 0 \text{ for } x < -1 \text{ or } x > 3\]

\[ f(x) = 0 \text{ for } x=-1,\,3\]

\[ f(x) < 0 \text{ for } -1 < x < 3 \]

Zeros

The zeros are the values that make at least one factor equal to zero:

\[ x+1=0 \Rightarrow x=-1, \qquad x-3=0 \Rightarrow x=3. \]

Sign chart

Conclusion

\(f(x)>0\) for \(x<-1\) or \(x>3\).

\(f(x)=0\) for \(x=-1\) and \(x=3\).

\(f(x)<0\) for \(-1<x<3\).

\[ f(x) > 0 \text{ for } -2 < x < 4\]

\[ f(x) = 0 \text{ for } x=-2,\,4\]

\[ f(x) < 0 \text{ for } x < -2 \text{ or } x > 4 \]

Observation

The factor \(-1\) reverses the sign of the product \((x+2)(x-4)\).

Zeros

\[ x+2=0 \Rightarrow x=-2, \qquad x-4=0 \Rightarrow x=4. \]

Sign chart

Conclusion

\(f(x)>0\) for \(-2<x<4\).

\(f(x)=0\) for \(x=-2\) and \(x=4\).

\(f(x)<0\) for \(x<-2\) or \(x>4\).

\[ f(x) > 0 \text{ for } x < 2 \text{ or } x > 3\]

\[ f(x) = 0 \text{ for } x=2,\,3\]

\[ f(x) < 0 \text{ for } 2 < x < 3 \]

Factorization

\[ x^2 - 5x + 6 = (x-2)(x-3) \]

Zeros

\(x=2\) and \(x=3\).

Sign chart

Conclusion

\(f(x)>0\) for \(x<2\) or \(x>3\).

\(f(x)<0\) for \(2<x<3\).

\[ f(x) > 0 \text{ for } -2 < x < 3\]

\[ f(x) = 0 \text{ for } x=-2,\,3\]

\[ f(x) < 0 \text{ for } x < -2 \text{ or } x > 3 \]

Factorization

\[ -x^2+x+6 = -(x^2-x-6)=-(x-3)(x+2) \]

Zeros

\(x=-2\) and \(x=3\).

Sign chart

Conclusion

\(f(x)>0\) for \(-2<x<3\).

\(f(x)<0\) for \(x<-2\) or \(x>3\).

\[ f(x) > 0 \text{ for } -1 < x < 2 \text{ or } x > 5\]

\[ f(x) = 0 \text{ for } x=-1,\,2,\,5\]

\[ f(x) < 0 \text{ for } x < -1 \text{ or } 2 < x < 5 \]

Zeros

\(x=-1\), \(x=2\), \(x=5\).

Observation

The zeros are simple, so the sign of the product changes when crossing each of them.

Sign chart

Conclusion

\(f(x)>0\) for \(-1<x<2\) or \(x>5\).

\(f(x)<0\) for \(x<-1\) or \(2<x<5\).

\[ f(x) > 0 \text{ for } x < -3 \text{ or } x > 1\]

\[ f(x)=0 \text{ for } x=1\]

\[ f(x) < 0 \text{ for } -3 < x < 1 \]

Domain

The denominator is zero at \(x=-3\). Therefore \(x\neq -3\).

Zero

The numerator is zero at \(x=1\).

Sign chart

Conclusion

\(x=-3\) is excluded from the domain; \(x=1\) is a zero of the function.

\[ f(x) > 0 \text{ for } -2 < x < 0 \text{ or } x > 2\]

\[ f(x)=0 \text{ for } x=-2,\,0,\,2\]

\[ f(x) < 0 \text{ for } x < -2 \text{ or } 0 < x < 2 \]

Factorization

\[ x^3-4x=x(x^2-4)=x(x-2)(x+2) \]

Zeros

\(x=-2\), \(x=0\), \(x=2\).

Sign chart

\[ f(x) > 0 \text{ for } -2 < x < 1 \text{ or } x > 2\]

\[ f(x)=0 \text{ for } x=-2,\,2\]

\[ f(x) < 0 \text{ for } x < -2 \text{ or } 1 < x < 2 \]

Factorization

\[ f(x)=\frac{(x-2)(x+2)}{x-1} \]

Domain

\(x\neq 1\).

Sign chart

\[ f(x) > 0 \text{ for } x > -\frac{1}{2},\ x\neq 3\]

\[ f(x)=0 \text{ for } x=-\frac{1}{2},\,3\]

\[ f(x) < 0 \text{ for } x < -\frac{1}{2} \]

Zeros

\(x=-\frac{1}{2}\) is a simple zero; \(x=3\) is a double zero.

Observation

The factor \((x-3)^2\) is always non-negative: the sign does not change when crossing \(x=3\).

Sign chart

\[ f(x) > 0 \text{ for } x < -2 \text{ or } 0 < x < 1 \text{ or } x > 4\]

\[ f(x) < 0 \text{ for } -2 < x < 0 \text{ or } 1 < x < 4 \]

Domain

\(x\neq 0\), \(x\neq 4\).

Zeros

\(x=-2\) and \(x=1\).

Sign chart

\[ f(x) > 0 \text{ for } x < -2,\ -1 < x < 1,\ x > 2\]

\[ f(x) < 0 \text{ for } -2 < x < -1 \text{ or } 1 < x < 2 \]

Factorization

\[ x^4-5x^2+4=(x^2-1)(x^2-4)=(x-1)(x+1)(x-2)(x+2) \]

Zeros

\(x=-2\), \(x=-1\), \(x=1\), \(x=2\).

Sign chart

\[ f(x) > 0 \text{ for } x < -3 \text{ or } 1 < x < 2 \text{ or } x > 2\]

\[ f(x) < 0 \text{ for } -3 < x < 1 \]

Factorization

\[ f(x)=\frac{(x-1)(x-2)}{(x+3)(x-2)} \]

Domain

\(x\neq -3\), \(x\neq 2\).

Simplification

For \(x\neq 2\), the function has the same sign as \(\frac{x-1}{x+3}\), but the point \(x=2\) remains excluded from the domain.

Sign chart

\[ f(x) > 0 \text{ for } x < -3,\ -1 < x < 1,\ x > 3\]

\[ f(x) < 0 \text{ for } -3 < x < -1 \text{ or } 1 < x < 3 \]

Factorization

\[ (x^2-1)(x^2-9)=(x-1)(x+1)(x-3)(x+3) \]

Zeros

\(x=-3\), \(x=-1\), \(x=1\), \(x=3\).

Sign chart

\[ f(x) > 0 \text{ for } -2 < x < -1 \text{ or } 0 < x < 1 \text{ or } x > 2\]

\[ f(x) < 0 \text{ for } x < -2 \text{ or } -1 < x < 0 \text{ or } 1 < x < 2 \]

Factorization

\[ f(x)=\frac{x(x-1)(x+1)}{(x-2)(x+2)} \]

Domain

\(x\neq -2\), \(x\neq 2\).

Zeros

\(x=-1\), \(x=0\), \(x=1\).

Sign chart

\[ f(x) > 0 \text{ for } x < -3 \text{ or } x > 2\]

\[ f(x)=0 \text{ for } x=-3,\,0,\,2\]

\[ f(x) < 0 \text{ for } -3 < x < 0 \text{ or } 0 < x < 2 \]

Zeros

\(x=-3\), \(x=0\), \(x=2\).

Observation

The zero \(x=0\) is double, so the sign does not change when crossing it.

Sign chart

\[ f(x) > 0 \text{ for } x < -2 \text{ or } -1 < x < 0 \text{ or } 0 < x < 1 \text{ or } x > 1\]

\[ f(x) < 0 \text{ for } -2 < x < -1 \]

Domain

\(x\neq -2\), \(x\neq 1\).

Zeros

\(x=-1\) and \(x=0\).

Observation

The factors \(x^2\) and \((x-1)^2\) do not change sign. The zero \(x=0\) is double and the pole \(x=1\) is double.

Sign chart

\[ f(x) > 0 \text{ for } 0 < x < 1 \text{ or } x > 1\]

\[ f(x) < 0 \text{ for } x < -1 \text{ or } -1 < x < 0 \]

Factorization

\[ x^4-1=(x^2-1)(x^2+1)=(x-1)(x+1)(x^2+1) \]

\[ x^3-x=x(x^2-1)=x(x-1)(x+1) \]

Domain

\[ x\neq -1,\quad x\neq 0,\quad x\neq 1 \]

Simplification

\[ f(x)=\frac{(x-1)(x+1)(x^2+1)}{x(x-1)(x+1)}=\frac{x^2+1}{x} \]

Since \(x^2+1>0\) for every \(x\in\mathbb{R}\), the sign depends only on \(x\), but \(x=-1\), \(x=0\), and \(x=1\) remain excluded from the domain.

Sign chart

\[ f(x)\geq 0 \text{ for every } x\in\mathbb{R}\]

\[ f(x)=0 \text{ for } x=-3 \text{ and } x=1 \]

Factorization

\[ x^2+2x-3=(x+3)(x-1) \]

\[ f(x)=\big[(x+3)(x-1)\big]^2 \]

Zeros

\(x=-3\) and \(x=1\).

Observation

The function is the square of a real expression, so it is always non-negative.

Sign chart

Conclusion

\(f(x)>0\) for all real numbers except \(-3\) and \(1\).

\(f(x)=0\) for \(x=-3\) and \(x=1\).

\[ f(x) > 0 \text{ for } x < -3 \text{ or } x > 2\]

\[ f(x) < 0 \text{ for } -3 < x < -1 \text{ or } -1 < x < 0 \text{ or } 0 < x < 2 \]

Domain

\(x\neq -3\), \(x\neq 0\).

Zeros

\(x=-1\) is a double zero; \(x=2\) is a simple zero.

Observation

The factors \((x+1)^2\) and \(x^2\) do not change sign. The sign depends on the factors \(x-2\) and \(x+3\), taking the excluded points into account.

Sign chart

\[ f(x) > 0 \text{ for } -2 < x < -1 \text{ or } -1 < x < 2 \text{ or } x > 2\]

\[ f(x)=0 \text{ for } x=-2; \quad f(x) < 0 \text{ for } x < -2 \]

Factorization of the numerator

\[ x^3+x^2-4x-4=x^2(x+1)-4(x+1)=(x+1)(x^2-4)=(x+1)(x-2)(x+2) \]

Factorization of the denominator

\[ x^2-x-2=(x-2)(x+1) \]

Domain

\(x\neq -1\), \(x\neq 2\).

Simplification

For \(x\neq -1\) and \(x\neq 2\):

\[ f(x)=\frac{(x+1)(x-2)(x+2)}{(x-2)(x+1)}=x+2 \]

The function therefore has the same sign as \(x+2\), but the points \(x=-1\) and \(x=2\) remain excluded from the domain.

Sign chart

Conclusion

\(f(x)>0\) for \(-2<x<-1\), \(-1<x<2\) or \(x>2\).

\(f(x)<0\) for \(x<-2\).

\(f(x)=0\) for \(x=-2\).

The points \(x=-1\) and \(x=2\) are excluded from the domain.