It would be a false concept since e is not rational.
It is rational.
example for sum of rational numbers is 1/3 + 1/5 Example for sum of irrationals is Pi + e where e is is base of natural log Another is square root of 2 + square root of 3.
rational
It is a rational number
e^pi ~ 23.14069.............., not rational
It would be a false concept since e is not rational.
It is rational.
No.
A rational number is one that can be expressed as a/b The sum of two rational numbers is: a/b + c/d =ad/bd + bc/bd =(ad+bc)/bd =e/f which is rational The difference of two rational numbers is: a/b - c/d =ab/bd - bc/bd =(ab-bc)/bd =e/f which is rational The product of two rational numbers is: (a/b)(c/d) =ac/bd =e/f which is rational
No
Because numbers such as pi, e and the square root of 2 are not rational.
Yes. All rational numbers must terminate or repeat. Rational: 1/3, 1/8, 13, 0.6666666666666... Not rational: π (pi), e, √2
Irrational.
No, it is irrational. Furthermore, it is transcendental.
One, and e.
Any number that can be expressed as a fraction is a rational number otherwise it is an irrational number.