(c) (For this question, assume that a function f and a number b are given). For every > 0 there exits M> 0 such that if x R satisfies > M then f(x) - b] < €. (d) For any two rational numbers a and b satisfying a < b there exists a rational number c such that a < c < b. For each one of these statements do each one of the following things: i. Translate the statement into 'symbolic logic'. ii. Write the negation of the statement in 'symbolic logic' without using the symbol ~ iii. Write the negation of the statement in English.

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S (a) The sum of any two integers is an integer. (b) For every real number a there exists another real number y such that y² — x² = 1. (c) (For this question, assume that a function f and a number b are given). For every € > 0 there exits M > 0 such that if x ER satisfies x > M then f(x) - b] < €. (d) For any two rational numbers a and b satisfying a < b there exists a rational number c such that a <c<b. For each one of these statements do each one of the following things: i. Translate the statement into 'symbolic logic'. ii. Write the negation of the statement in 'symbolic logic' without using the symbol ~ iii. Write the negation of the statement in English.