Respuesta :
Answer: [tex]301[/tex]
Step-by-step explanation:
Since, The LCM of numbers given numbers [tex]2[/tex] ,[tex]3[/tex], [tex]4[/tex] and [tex]5[/tex] is [tex]60[/tex].
Thus, the number that gives 1 as reminder and is the multiple of 7 is [tex]60 n + 1[/tex]
Where n is any positive integer,
Since, For [tex]n = 5[/tex],
The number is, [tex]60\times 5 + 1 = 300 + 1 = 301[/tex]
Which is divisible by [tex]7[/tex].
Thus, the required number is 301.
Note : For n = 1, 2 3 and 4, numbers are 61, 121, 181 and 241
But they are not the multiple of 7.
Answer:
The required number is 301
Step-by-step explanation:
Let the number be N.
The number when divided by 2, 3, 4, 5 leaves the remainder 1 so, N-1 is divisible by 2, 3, 4, 5. So, possible cases of N-1 are : multiples of l.c.m.(2, 3,4, 5) = multiples of 60
- N-1 = 60 but 61 is not divisible by 7. So rejected
- N-1 = 120 but 121 is not divisible by 7. So rejected
- N-1 = 180 but 181 is not divisible by 7. So rejected
- N-1 = 240 but 241 is not divisible by 7. So, rejected
- N-1 = 300 and 301 is divisible by 7 So 301 is our required number.
