contestada

The counting number ABAB is a multiple of 36. If different letters represent Reset different digits, what is the greatest value ABAB can have?

Respuesta :

LammettHash

If ABAB is supposed to be a 4-digit number, then

ABAB = AB00 + AB = 100 × AB + AB = (100 + 1) × AB = 101 × AB

Since 101 is prime, AB must itself be a 2-digit multiple of 36, the largest of which is 2 × 36 = 72.

So, ABAB = 7272.

onyebuchinnaji

The greatest value ABAB can have is 7272.

The given number:

  • ABAB = multiple of 36

The given number can expanded as follows;

ABAB = AB00 + 00AB

          = AB x 100   +  AB

          = AB (100 + 1)

          = AB (101)

The prime factor of 101 = 1 x 2

Since 101 is prime, the counting number AB must 2-digits multiples of 36.

The greatest value ABAB can have is calculated as follows;

ABAB = (36 x 2)(36 x 2)

ABAB = 7272

Learn more about prime counting here: https://brainly.com/question/12496916

Otras preguntas