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Suggested: y=x^2+1 graph - y=x^2+1 - y=log(x+√(x^2+1)) prove that - y=sin^-1(1-x^2/1+x^2) - y=cos^-1(1-x^2/1+x^2) find dy/dx - y=log(x+√(x^2+1)) find yn(0) - y^2-2pxy+p^2(x^2-1)=m^2 - y=sec inverse 1/2 x^2-1 - y=(1+x)(1+x^2)(1+x^4)(1+x^8) find dy/dx - y=(x^2-1)^n nth derivative - y=x^2-14x+22 - (d^3-d^2-6d)y=x^2+1 - verify that x3+y3+z3-3xyz=1/2(x+y+z) (x-y)2+(y-z)2+(z-x)2 - 3x/2-5y/3=-2 x/3+y/2=13/6 by substitution method - y=x^2+1               

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