Let a = 68, b = 33, and n = a. Verify that 7|(68– 33). b. Explain why 68 = 33 (mod 7). c. What value of k has the property that 7. %3D %3D - 68 = 33+7k? d. What is the (nonnegative) remainder obtained...

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Let a = 68, b = 33, and n =<br>a. Verify that 7|(68– 33).<br>b. Explain why 68 = 33 (mod 7).<br>c. What value of k has the property that<br>7.<br>%3D<br>%3D<br>-<br>68 = 33+7k?<br>d. What is the (nonnegative) remainder obtained<br>when 68 is divided by 7? When 33 is divided<br>by 7?<br>e. Explain why 68 mod 7 = 33 mod 7.<br>

Extracted text: Let a = 68, b = 33, and n = a. Verify that 7|(68– 33). b. Explain why 68 = 33 (mod 7). c. What value of k has the property that 7. %3D %3D - 68 = 33+7k? d. What is the (nonnegative) remainder obtained when 68 is divided by 7? When 33 is divided by 7? e. Explain why 68 mod 7 = 33 mod 7.

Jun 02, 2022

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Let a = 68, b = 33, and n = a. Verify that 7|(68– 33). b. Explain why 68 = 33 (mod 7). c. What value of k has the property that 7. %3D %3D - 68 = 33+7k? d. What is the (nonnegative) remainder obtained...

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