Find the largest possible positive integer that will divide 398, 436 and 542 leaving remainder 7, 11, 15 respectively
Answers
Answer:
Hence, HCF of 391, 4250 and 527 is 17 because the greatest common factor from all the numbers is 17 only. So we can say that the largest number that will divide 398, 436 and 542 leaving remainders 7, 11 and 15 respectively is 17.
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Answer:
♥︎17♥︎
Step-by-step explanation:
Here we go through by finding the HCF of the number after subtracting their remainder because we know that The largest or greatest factor common to any two or more given natural numbers is termed as HCF of given numbers. Also known as GCD (Greatest Common Divisor).
Here we go through by finding the HCF of the number after subtracting their remainder because we know that The largest or greatest factor common to any two or more given natural numbers is termed as HCF of given numbers. Also known as GCD (Greatest Common Divisor).Complete step-by-step answer:
Here we go through by finding the HCF of the number after subtracting their remainder because we know that The largest or greatest factor common to any two or more given natural numbers is termed as HCF of given numbers. Also known as GCD (Greatest Common Divisor).Complete step-by-step answer:Here in this question for finding the numbers that will divide 398, 436 and 542 leaving remainder 7, 11 and 15 respectively we have to first subtract the remainder of the following. By this step we find the highest common factor of the numbers.
Here we go through by finding the HCF of the number after subtracting their remainder because we know that The largest or greatest factor common to any two or more given natural numbers is termed as HCF of given numbers. Also known as GCD (Greatest Common Divisor).Complete step-by-step answer:Here in this question for finding the numbers that will divide 398, 436 and 542 leaving remainder 7, 11 and 15 respectively we have to first subtract the remainder of the following. By this step we find the highest common factor of the numbers.And then the required number is the HCF of the following numbers that are formed when the remainder are subtracted from them.
Here we go through by finding the HCF of the number after subtracting their remainder because we know that The largest or greatest factor common to any two or more given natural numbers is termed as HCF of given numbers. Also known as GCD (Greatest Common Divisor).Complete step-by-step answer:Here in this question for finding the numbers that will divide 398, 436 and 542 leaving remainder 7, 11 and 15 respectively we have to first subtract the remainder of the following. By this step we find the highest common factor of the numbers.And then the required number is the HCF of the following numbers that are formed when the remainder are subtracted from them.Clearly, the required number is the HCF of the numbers 398−7=391,436−11=425, and, 542−15=527
Here we go through by finding the HCF of the number after subtracting their remainder because we know that The largest or greatest factor common to any two or more given natural numbers is termed as HCF of given numbers. Also known as GCD (Greatest Common Divisor).Complete step-by-step answer:Here in this question for finding the numbers that will divide 398, 436 and 542 leaving remainder 7, 11 and 15 respectively we have to first subtract the remainder of the following. By this step we find the highest common factor of the numbers.And then the required number is the HCF of the following numbers that are formed when the remainder are subtracted from them.Clearly, the required number is the HCF of the numbers 398−7=391,436−11=425, and, 542−15=527 HCF of 391, 425 and 527 = 17
Here we go through by finding the HCF of the number after subtracting their remainder because we know that The largest or greatest factor common to any two or more given natural numbers is termed as HCF of given numbers. Also known as GCD (Greatest Common Divisor).Complete step-by-step answer:Here in this question for finding the numbers that will divide 398, 436 and 542 leaving remainder 7, 11 and 15 respectively we have to first subtract the remainder of the following. By this step we find the highest common factor of the numbers.And then the required number is the HCF of the following numbers that are formed when the remainder are subtracted from them.Clearly, the required number is the HCF of the numbers 398−7=391,436−11=425, and, 542−15=527 HCF of 391, 425 and 527 = 17 So we can say that the largest number that will divide 398, 436 and 542 leaving remainders 7, 11 and 15 respectively is 17.