You may think that the fraction
x
xdoes exist, and that it is equal to 1, on cancellation of thex. But again this is only true
ifx =0. The expression is not defined forx=0, that is, there is no number equal to^00.
In general then,algebraic fractions are not defined for those values ofxwhich make
their denominator vanish.
Examples
1
x− 1
is not defined atx= 1x− 2
x− 2is not defined atx= 2x+ 1
x^2 − 2 x− 3is not defined atx=−1andx= 3 (why?)Just as an arithmetic fraction such as^23 is called a rational number, a general algebraic
function of the form:
Polynomial
Polynomialis called arational function. The polynomial on the top is thenumeratorthat on the
bottom thedenominatorin analogy with numerical fractions.
Examples
x+ 1
x+ 2
,x^2 + 2 x− 3
x^2 + 4 x+ 2are rational functions, whereas
√
x+ 1
x+ 2,x^2 + 3 x− 4
x+√
xare not because neither of
√
x+1orx+√
xare polynomials.Solution to review question 2.1.7(i)x− 1
x^2 + 1and (iii)x− 1
x^2 +x+ 1are both of the formpolynomial
polynomialand are therefore rational functions.(ii)√
x+1
√
xand (iv)√
x− 1
x+ 1are not rational functions because of the
square roots.