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Simplify –(3ab2)–3 (1 point)

  1. Read the following proof of the polynomial identity a3+b3=(a+b)3−3ab(a+b).Step 1: a3+b3=a3+3a2b+3ab2+b3−3ab(a+b) Step 2:
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  2. Simplify –(3ab2)–3 (1 point)
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  3. Simplify -(3ab2)-3(1 point)
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  4. Simplify -(3ab2)-3(1 point) 1 sa 3° 0-1 2703° 1 〇-= 3035 • 27a366
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  5. Simplify –(3ab2)–3
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  6. Simplify –(3ab2)–3
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  7. Simplify the following. Show work on paper(3ab2)−2 5d−3×d10 2/6√ 3x−12/x−4 243−−−√
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  8. Simplify the following. Show work on paper and attach as file upload.(10 points)(3ab2)^−2
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  9. If a and b are positive numbers, which expression is equivalent to 27a6b527a5 b63a²bb23a²b³√3a ○27ab (√a-√b)
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    2. idk asked by idk
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  10. Rewrite 24a5b + 6ab2 using a common factor.a 6ab(2a5b + ab2) b 3ab(8a4 + 2b) c 6ab(12a4 + 2ab2) d 8a5b(4 + 3ab2)
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