What is the negation of "If \( a^{2} \leqslant b^{2} \) then \( a \neq b \) "? Select one: a. If \( a=b \) then \( a^{2}>b^{2} \). b. If \( a \neq b \) then \( a \leqslant b \). c. If \( a=b \) then \( a \leqslant b \). d. \( a^{2} \leqslant b^{2} \) and \( a=b \) e. If \( a^{2}>b^{2} \) then \( a=b \). f. If \( a^{2} \leqslant b^{2} \) then \( a \neq b \).
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"If a2⩽b2" - This means that a squared is less than or equal to b squared. Show more…
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