Respuesta :
False statement is; D; every integer is also an irrational number.
From the comments section, we can see the missing options.
To answer this question, we need to understand the meaning of real numbers and the types of real numbers.
- Real numbers are simply defined as any type of number in real life that is not a complex number. This means they could be fractions, decimals, positive numbers, negative numbers e.t.c
- Generally, real numbers have two major types namely: Rational Numbers and Irrational numbers.
Now, rational numbers include; integers, Natural numbers, whole numbers, fractions, terminating decimals, repetitive decimals.
Meanwhile, Irrational numbers are simply defined as any number that can't be expressed in the form of fraction of integers; their decimals are usually in the form of non-repeating and non-terminating decimals.
Let's look at the given options;
- Option A; This is true because as seen earlier that a real number is every type of number with the exception of complex numbers.
- Option B; every integer is also a real number; This statement is true because from the definition given, we can see that integers are part of the real number family under the sub group of rational numbers.
- Option C; This statement is true because as clearly stated in the definitions earlier, we see that irrational numbers are clearly distinct from rational numbers.
- Option D; This statement is false because as clearly stated in the definitions earlier, an integer is also defined as a number that is a rational number but doesn't have the characteristics of an irrational number.
Thus, Statement D is false.
Read more at; brainly.com/question/10730414
