ROOTS, real and imaginary. The odd roots, as the 3d, 5th, 7th, &c. of all real quantities, whether positive or negative, are real, and are respectively positive or negative. So the cube root of a^3 is a, and of -a^3 is -a. But the even roots, as the 2d, 4th, 6th, &c. are only real when the quantity is positive, being imaginary or impossible when the quantity is negative. So the square root of a^2 is a, which is real; but the square root of -a^2, that is, \sqrt{-a^2}, is imaginary or impossible, because there is no quantity, neither +a nor -a, which by squaring will make the given negative square -a^2.