138 Irrational and Real Numbers
Quotient of quotients
For all real numbers w, x, y, and z where x≠ 0, y≠ 0, and z≠ 0,
(w /x)/(y /z)= (w /x)(z /y)
= (w /y)(z /x)
= (wz)/(xy)Sum of quotients
For all real numbers w, x, y, andz where x≠ 0 and z≠ 0,w /x+y /z= (wz+xy)/(xz)Integer roots
Suppose that x is a positive real number. Also suppose that n is a positive integer. Then the nth
root of x can also be expressed as the 1/n power of x. The second root (or square root) is the
same thing as the 1/2 power, the third root (or cube root) is the same thing as the 1/3 power,
the fourth root is the same thing as the 1/4 power, and so on.Rational-number powers
Suppose that x is a real number. Also suppose that m and n are integers, and n≠ 0. Thenxm /n= (xm)1/n= (x1/n)mNegative powers
Letx be a nonzero real number. Let y be any real number. Thenx−y= (1/x)y= 1/(xy)Sum of powers
For all nonzero real numbers x, y, and z,x(y+z)=xyxzDifference of powers
For all nonzero real numbers x, y, andz,x(y−z)=xy/xzProduct of powers
For all nonzero real numbers x, y, and z,xyz= (xy)z= (xz)y