Two numbers are called relatively prime if their greatest common divisor is $1$. Grogg's favorite number is the product of the i
ntegers from $1$ to $10$. What is the smallest integer greater than $500$ that is relatively prime to Grogg's favorite number?
1 answer:
Product of the integers from $1$ to $10$ is $3628800$.
So, Grogg's favorite number is $3628800$.
The smallest integer greater than $500$ that is relatively prime to Grogg's favorite number should not have a common divisor with $3628800$.
This means, that number should not be divisible by any of the integers from $2$ to $10$.
Clearly, $503$ is the smallest integer greater than $500$ that is relatively prime to Grogg's favorite number.
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Answer:
∠RQS = 21°
∠TQU = 28°
Step-by-step explanation:
90° + 221° + 3x + 4x = 360°
combine like terms:
7x + 311° = 360°
subtract 311° from each side of the equation:
7x = 49°
divide both sides by 7:
x = 7°
∠RQS = 3x = 3(7°) = 21°
∠TQU = 4x = 4(7°) = 28°
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Step-by-step explanation:
