Write the two numbers which are divisible by 5 using the digits7,0, 5and 6giy vvb gergegsfdf vggggghhjnnmufygu
Answers
Answer:
The answer is 10080.
Lets see how we get the answer.
First of all check that if any number is divisible by 6, then it is divisible by 2 and 3 as 2 and 3 are factors of 3.
So, the question reduces to smallest number of 5 digit which is exactly divisible by 4,5,6,7.
To find the number,we have to find the common multiple of 4,5,6,7
.Taking the LCM of 4,5,6,7, we get
12 * 5 * 7 =420.
So, we have to find the smallest number of 5 digits which is exactly divisible by 420.
Lets multiply the number by 20, we get
420*12 = 8400.
Now , we are very close.
Now, we have to add some number X to 8400 such that result becomes a 5 digit number and also X is divisible by 420.
Adding 420 * 4( =1680) to 8400, we get
8400 + 1680 =10080 which is the smallest number.
Hence , 10080 is the required answer.
Note that, we have to add a number greater than 1600 to 8400 to make it a 5 digit number.The smallest multiple of 420 greater than 1600 is 1680.
So , we add it to 8400.
Property Used -
According to Euclid's theorem, if A and B are divisible by a number C, then
A + B and A - B are also divisible by C.
Here, we have used this to get the answer.
8400 + 1680 =10080.
Hope that helps. :)
Substituting the value of z in equation (ii), we get
y−(x−10)=6
⇒−x+y=−4 ...(iv)
Adding equations (i) and (iv), we get
x=0
Putting x=0 equation in (i) and (iii) we get
y=−4 and z=−10
Hence, x=0,y=−4,z=−10 is the solution of the given system of equations.