Qusetion 1
If a is a natural number divisible by 7 and a<90 then the greatest possible value of a is .....................
Question 2
b0b04 +40b0b+b040b=10101*11*2 b=
Find a natural number so that the divisor is divisible by 9, then the number is 7 and the balance is the largest.
That number is ...
Tìm 1 số tự nhiên sao cho khi chia số đó cho 9 thì được thương là 7 và có số dư lớn nhất.
Giải:
Vì số chia là 9 nên số dư lớn nhất là: 8
Số đó là: 9x7+8 = 71
Đáp số : 71
if c is a two - digit number , c+2 is divisible by 11 and c + 9 is divisible by 7 then c = ?
Câu 1: Given that is divisible by 9. What is the value of ?
Câu 2: How many elements of the set A are divisible by 9?
Câu 3:A is a set of multiples of 12 less than 12. How many elements does the set A have?
Câu 4:Find the remainder when is divided by 3.
Câu 5:Given that 511 is the sum of two prime numbers and , . What is the value of ?
Câu 6:Given that . Find the value of .
Câu 7:Given that . How many divisors does the number A have?
Câu 8:Find the natural number so that the product of and 5 is a prime number.
Câu 9:
Given that . How many divisors does the number A have?
Câu 10:
Given that . How many divisors the number A have?
Câu 1: Cho chia hết cho 9. giá trị là gì?
Câu 2: Có bao nhiêu phần tử của tập A chia hết cho 9?
Câu 3: A là một tập hợp các bội số của 12 ít hơn 12. Làm thế nào nhiều yếu tố không tập A có?
Câu 4: Tìm dư khi chia cho 3. Câu 5: Cho rằng 511 là tổng của hai số nguyên tố và,. giá trị là gì?
Câu 6: Cho rằng. Tìm giá trị của.
Câu 7: Cho rằng. không số A có bao nhiêu ước?
Câu 8: Tìm số tự nhiên vì thế sản phẩm và 5 là số nguyên tố.
Câu 9: Cho rằng. không số A có bao nhiêu ước?
Câu 10: Cho rằng. Một số có bao nhiêu ước?
Câu 1: Given that is divisible by 9. What is the value of ?
Câu 2: How many elements of the set A are divisible by 9?
Câu 3:A is a set of multiples of 12 less than 12. How many elements does the set A have?
Câu 4:Find the remainder when is divided by 3.
Câu 5:Given that 511 is the sum of two prime numbers and , . What is the value of ?
Câu 6:Given that . Find the value of .
Câu 7:Given that . How many divisors does the number A have?
Câu 8:Find the natural number so that the product of and 5 is a prime number.
Câu 9:
Given that . How many divisors does the number A have?
Câu 10:
Given that . How many divisors the number A have?
Câu 1: Given that is divisible by 9. What is the value of ?
Câu 2: How many elements of the set A are divisible by 9?
Câu 3:A is a set of multiples of 12 less than 12. How many elements does the set A have?
Câu 4:Find the remainder when is divided by 3.
Câu 5:Given that 511 is the sum of two prime numbers and , . What is the value of ?
Câu 6:Given that . Find the value of .
Câu 7:Given that . How many divisors does the number A have?
Câu 8:Find the natural number so that the product of and 5 is a prime number.
Câu 9:
Given that . How many divisors does the number A have?
Câu 10:
Given that . How many divisors the number A have?
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Exer 1: Given two natural numbers whose sum are 78293. The bigger number where 5 is the units digit and 2 is hundred digit. If we clean these digits then we obtain a number which equals the smaller number. Find two natural numbers.
Exer 2: Prove that: If x, y \(\in\) N and x + 2y divisible by 5 then 3x - 4y divisibles by 5.
Exer 3: Given that 2x + 5y \(⋮\) 7. Prove that 4x + 3y \(⋮\) 7.
Exer 1:
Solution:
Suppose that, the unknown number is: \(\overline{x215}\) (where x \(\in\) N).
When we clean three digits then the smaller number is \(\overline{x}\).
We have: \(\overline{x215}\) + \(\overline{x}\) = 78293
\(\Rightarrow\) 1000. \(\overline{x}\) + 215 + \(\overline{x}\) = 78293
1001. \(\overline{x}\) = 78078
x = 78
Thus, we found two natural number: 78215 and 78.
Exer 2:
Solution:
We have: x + 2y \(⋮\) 5
\(\Rightarrow\) 2x + 4y \(⋮\) 5
(2x + 4y) + (3x - 4y) = 5x \(⋮\) 5
\(\Rightarrow\) 2x + 4y \(⋮\) 5
Deduce 3x - 4y \(⋮\) 5.
Exer 3:
Solution:
We have: 2x + 5y \(⋮\) 7
4x + 10y \(⋮\) 7
(4x + 10y) - (4x + 3y) = 7y \(⋮\) 7
\(\Rightarrow\) 4x + 10y \(⋮\) 7
Deduce 4x + 3y \(⋮\) 7.
5, 6 and 7 are three consecutive numbers.
5+6+7=18, which is divisible by 3.
when you add any three consecutive number, total is divisible by 3.
a) is this always, sometimes, never true?
b) what if you add four cosnecutive number?
bn nào thông minh giúp mk nhé mk tặng 1 lik-e
Suppose \(\overline{ab}\) is a 2 digit number with the property that the 6 digit number \(\overline{1234ab}\) is divisible by 9 and \(\overline{ab1234}\) is divisible by 11. What is a2 - b2
if we write all of the whole numbers from 10 through 99 and cross out any number in wich the fist or second dugit is divisible by 3 (for example ,41 is crossd out as 4 is divisible by 2 and 36 is crossed out a
s 6 is divisible by 2 ) , how many numbers are crossed out ?
Find the greatest 4-digit number which is divisible by both 4 and 7 . That number is ..........
Find a 3-digit number, know that that number is divisible by 18 and its proportional numerals 1, 2, 3?
Call the smallest digit a => 3-digit number a, 2a, 3a with 3a ≤ 9 => a ≤ 3. Find the number divisible by 18, which is divisible by 9, so (a + 2a + 3a) = 6a is divisible by 9 => a is divisible by 3, so a = 3 => 3 digits are 3, 6, 9
The number to find is even by dividing by 2, so the last digit is 6
=> 396 or 936
Call the smallest digit a => 3-digit number a, 2a, 3a with 3a ≤ 9 => a ≤ 3. Find the number divisible by 18, which is divisible by 9, so (a + 2a + 3a) = 6a is divisible by 9 => a is divisible by 3, so a = 3 => 3 digits are 3, 6, 9
The number to find is even by dividing by 2, so the last digit is 6
=> 396 or 936