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∫x52+x6dx\int x^5\sqrt{2+x^6}dx∫x52+x6dx
x2−1+x−2x^{2-1+x^{-2}}x2−1+x−2
−42x+21x−28x-42x+21x-28x−42x+21x−28x
3x2+3y2+12x−6y+15=03x^2+3y^2+12x-6y+15=03x2+3y2+12x−6y+15=0
∫9x+4(x2+x−6)dx\int\frac{9x+4}{\left(x^2+x-6\right)}dx∫(x2+x−6)9x+4dx
∫64−(x+1)2dx\int\frac{6}{\sqrt{4-\left(x+1\right)^2}}dx∫4−(x+1)26dx
xy2−6⋅xy2−7xy2-6\cdot xy2-7xy2−6⋅xy2−7
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