${\displaystyle ax=a}$

${\displaystyle a\cdot (x\cdot a^{-1})=a\cdot a^{-1}=1}$

${\displaystyle a\cdot (a^{-1}\cdot x)=1}$

${\displaystyle (a\cdot a^{-1})\cdot x)=1}$

${\displaystyle 1\cdot x=1}$

${\displaystyle x=1}$

${\displaystyle (x-y)(x+y)=(x\cdot (x-y)+y\cdot (x-y))}$

${\displaystyle =(x^2-xy)+(xy-y^2)}$

${\displaystyle =x^2-xy+xy-y^2}$

${\displaystyle =x^2-y^2}$

${\displaystyle x^2=y^2}$, then

${\displaystyle x^2-y^2=(x+y)(x-y)=0}$

Either ${\displaystyle (x+y)=0}$, which means ${\displaystyle x=-y}$ or ${\displaystyle (x-y)=0}$, which means that ${\displaystyle x=y}$.

${\displaystyle x^3-y^3=(x-y)(x^2+xy+y^2)}$

${\displaystyle =(x-y)x^2+(x-y)xy+(x-y)y^2}$

${\displaystyle =(x^3-x^{2}y+x^{2}y-x{y}^2+x{y}^2-y^3}$

${\displaystyle =x^3-y^3}$

${\displaystyle x^n-y^n=(x-y)(x^{n-1}+x^{n-2}y+...+x{y}^{n-2}+y^{n-1})}$

${\displaystyle =x(x^{n-1}+x^{n-2}y+...+x{y}^{n-2}+y^{n-1})-y(x^{n-1}+x^{n-2}y+...+x{y}^{n-2}+y^{n-1})}$

${\displaystyle =(x^n+x^{n-1}y+...+x^2{y}^{n-2}+x{y}^{n-1})-(x^{n-1}y+x^{n-2}{y}^2+...+x{y}^{n-1}+y^n)}$

${\displaystyle =x^n-y^n}$

Note that the two middle terms do no appear to match, but if you follow the logical development in each term, you will see that there is a matching additive inverse for each term on both sides.

Use the same method as iv, expand the expression and cancel.

${\displaystyle x^2=xy}$ implies that ${\displaystyle x=y}$ and thus ${\displaystyle x-y=0}$. Step 4 requires division by ${\displaystyle x-y=0}$ and thus is an invalid step.

All values of x satisfy the inequality, since it can be rewritten as ${\displaystyle -3<x^2}$, and ${\displaystyle x^2>=0}$ for all x.

If ${\displaystyle 5-x^2<-2}$, then ${\displaystyle x^2>7}$.

Thus, ${\displaystyle x>\sqrt{7}}$, or ${\displaystyle x<-\sqrt{7}}$.

${\displaystyle x^2-2x+2}$ cannot be factored in its current form, so we first turn a part of the expression into a perfect square:

${\displaystyle (x^2-2x+1)+1>0}$

We then complete the square on ${\displaystyle x^2-2x+1=(x-1{)}^2}$, so now we have the expression:

${\displaystyle (x-1{)}^2+1>0}$, which is positive for all values of x.

If ${\displaystyle x^2+x+1>2}$, then ${\displaystyle x^2+x-1>0}$.

${\displaystyle x^2+x-1=(x+\frac{1+\sqrt{5}}{2})(x-\frac{\sqrt{5}-1}{2})}$

Thus ${\displaystyle x<-\frac{1+\sqrt{5}}{2}}$, or ${\displaystyle x>\frac{\sqrt{5}-1}{2}}$.

Complete the square:

${\displaystyle x^2+x+1=x^2+x+\frac{1}{4}+\frac{3}{4}={(x+\frac{1}{2})}^2+\frac{3}{4}}$

Thus, ${\displaystyle {(x+\frac{1}{2})}^2+\frac{3}{4}>0}$.

Solve for ${\displaystyle (x-\pi )(x+5)>0}$ first, then consider the third factor ${\displaystyle (x-3)}$ for both cases, giving us ${\displaystyle -5<x<3}$, or ${\displaystyle x>\pi }$

${\displaystyle x>\sqrt{2}}$, or ${\displaystyle x<\sqrt[3]{2}}$

If ${\displaystyle 2^x<8}$, then taking the base 2 logarithm on both sides:

${\displaystyle lo{g}_2{2}^x<lo{g}_{2}8=x<3}$

${\displaystyle x<1}$

NOTE: The answer in the 3rd Edition provides ${\displaystyle 0<x<1}$ or ${\displaystyle x>1}$. Plugging in values ${\displaystyle x>1}$, e.g. 10, gives us ${\displaystyle 1/10-1/9<0}$, so I think this is a misprint or an incorrect answer.

If ${\displaystyle \frac{1}{x}+\frac{1}{1-x}>0}$, then ${\displaystyle \frac{1}{x-x^2}>0}$, which is only positive when ${\displaystyle 0<x<1}$ since ${\displaystyle x^2>x}$.

${\displaystyle a+c<b+d}$

${\displaystyle =(b+d)-(a+c)>0}$

${\displaystyle =(b-a)+(d-c)>0}$, which is true since ${\displaystyle (b-a),(d-c)>0}$

${\displaystyle b-a>0}$

${\displaystyle =-a+b>0}$

${\displaystyle =-a-(-b)>0}$

${\displaystyle =-b<-a}$

${\displaystyle (b-a),c>0}$, therefore ${\displaystyle c(b-a)>0}$.

${\displaystyle c(b-a)=bc-ac}$, therefore ${\displaystyle ac<bc}$.

${\displaystyle a>1}$, therefore ${\displaystyle 1-a>0}$.

${\displaystyle a(1-a)>0}$

${\displaystyle =a^2-a>0}$

${\displaystyle =a^2>a}$

If ${\displaystyle a}$ or ${\displaystyle c}$ are 0, then by definition ${\displaystyle ac<bd}$.

Otherwise, we have already proved that ${\displaystyle ac<bc}$ for ${\displaystyle a,c>0}$, therefore if ${\displaystyle c<d}$, ${\displaystyle ac<bd}$ is true.

If ${\displaystyle a=0}$, then ${\displaystyle a^2<b^2}$ since ${\displaystyle b^2>0}$.

If ${\displaystyle 0<a<b}$, then ${\displaystyle a^2<ab}$. Since ${\displaystyle ab<b^2}$, we have ${\displaystyle a^2<b^2}$.

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