# Divisibility Rules Practice Problems Pdf

Divisibility Rules Practice Problems Pdf. The sum of their digits is a multiple of 7. Test if the numbers are divisible by 4, by dividing the last 2 digits of the number by 4.

The sample problem is addressed and two practice issues are provided. Number 200 4518 556 450 368 8640 divisible by: 92,659,354,236 is divisible by 2 since the ones digit is a 6 3 if and only if the sum of its digits is divisible by 3 ex:

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Divisibility rules review and practice. Use divisibility rules to test each number for the divisibility by 6. Since 7+4+ 6 + 9 + 8 + 8 = 42 and 3j42 we conclude that 6j746;988:

### A Number Is Divisible By:

24 24 is divisible by both 2 and 3 Students find the missing digit so that the number is divisible by that number. In the given number 338, twice the digit in one’s place is.

### It Is Important For Students To Understand Whether An Integer Is Divisible By A.

5 if the last digit ends in 5 or 0. Number 200 4518 556 450 368 8640 divisible by: Learning and practicing the rules for divisibility help students.

### 222 Is Divisible By Six Because It Is Even, So It Is Divisible By Two And Its Digits Add Up To Six, Which Makes It Divisible By Three Nine (9) A Number Is Divisible By Nine If The Sum Of The Digits Adds Up To A Multiple Of Nine.

Determine if each number is divisible by 2,3,5,6,9. (a) 746,988 (b) 4,201,012 solution. The ones digit is either 0, 2, 4, 6, or 8) ex:

### This Rule Is Similar To The Divisibility Rule For Three.

\begin{aligned} a :& \text{the last. Fill in the digits to make this number divisible by 4 & 6. 954 is divisible by 3 since 9 + 5 + 4 =.