50 POINTS, WILL GIVEE BRAINLIEST
Select from the drop-down menus to correctly complete the proof. To prove that 2√2 is irrational, assume the product is rational and set it equal to ​ ab ​, where b is not equal to 0: 2√2=ab . Isolating the radical gives 2√=a2b . The left side of the equation is---. Because the right side of the equation is ---- , this is a contradiction. Therefore, the assumption is wrong, and the number 2√2 is ---

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irrational
rational