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ψ(r)=arctan(1/(1-r^2))
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ψ(r)=\arctan(\frac{1}{1-r^{2}})
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f(x)=((sin(x)+cos(x)))/(cos(2x))
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f(x)=\frac{(\sin(x)+\cos(x))}{\cos(2x)}
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f(x)=3x^2+7x+3
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f(x)=3x^{2}+7x+3
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f(x)=3(2)
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f(x)=3(2)
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f(x)=3x^3-5x^2+x+3
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f(x)=3x^{3}-5x^{2}+x+3
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f(x)=3+sqrt(6x-3)
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f(x)=3+\sqrt{6x-3}
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critical points f(2)=xe^{-4x}
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critical\:points\:f(2)=xe^{-4x}
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f(x)=ln(3x+5)
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f(x)=\ln(3x+5)
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f(x)= 1/(1-x)*1/(2+x)
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f(x)=\frac{1}{1-x}\cdot\:\frac{1}{2+x}
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y=sqrt(1+4x),1<= x<= 5
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y=\sqrt{1+4x},1\le\:x\le\:5
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f(x)=((6x^2+16x+5))/((2x))
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f(x)=\frac{(6x^{2}+16x+5)}{(2x)}
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f(x)=2^{(x+2)}
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f(x)=2^{(x+2)}
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f(x)=e^{x^2}-3ln(arcsin(x^2+1))
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f(x)=e^{x^{2}}-3\ln(\arcsin(x^{2}+1))
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y=2sqrt(-3x-15)
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y=2\sqrt{-3x-15}
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f(x)=(4x+5)^3
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f(x)=(4x+5)^{3}
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f(x)=(sin(x))/((1-cos(x)))
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f(x)=\frac{\sin(x)}{(1-\cos(x))}
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g(x)=4(x+4)^2-5
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g(x)=4(x+4)^{2}-5
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asíntotas f(x)=2
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asíntotas\:f(x)=2
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paralela y=-4/3 x-17,(4,-12)
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paralela\:y=-\frac{4}{3}x-17,(4,-12)
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y=(4x-2)/(x(x^2+1))
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y=\frac{4x-2}{x(x^{2}+1)}
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f(20.3)=-5x^2+350x
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f(20.3)=-5x^{2}+350x
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f(w)=25+64w^2
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f(w)=25+64w^{2}
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y=(x-5)/((x+2)^2)
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y=\frac{x-5}{(x+2)^{2}}
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f(x)=((3x+2))/4
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f(x)=\frac{(3x+2)}{4}
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f(x)=2e^x+e^{-x}
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f(x)=2e^{x}+e^{-x}
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f(x)=((x-5)(x-12))/((x+3)(x-2)(x-5))
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f(x)=\frac{(x-5)(x-12)}{(x+3)(x-2)(x-5)}
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f(x)=(x-1)/(ln(x-2))
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f(x)=\frac{x-1}{\ln(x-2)}
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y=6x+35
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y=6x+35
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y=(2x+3)/(2x^2+x-1)
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y=\frac{2x+3}{2x^{2}+x-1}
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domínio f(x)=e^t
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domínio\:f(x)=e^{t}
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f(x)=-1/6 x^2
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f(x)=-\frac{1}{6}x^{2}
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f(x)=4-2sqrt(9-x)
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f(x)=4-2\sqrt{9-x}
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f(x)=(3x)/(x^2+2x-8)
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f(x)=\frac{3x}{x^{2}+2x-8}
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f(x)=4x^{1/2}+5x^{(-1)/2}
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f(x)=4x^{\frac{1}{2}}+5x^{\frac{-1}{2}}
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f(x)=2x^3-11x^2+7x-5
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f(x)=2x^{3}-11x^{2}+7x-5
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f(x)= 1/(sqrt(4-2x))
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f(x)=\frac{1}{\sqrt{4-2x}}
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f(x)=|x+5|-3
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f(x)=\left|x+5\right|-3
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f(x)=-0.4x^2+80x-200
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f(x)=-0.4x^{2}+80x-200
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f(x)=sqrt((x^2+6x+5)/(x^2-2x+3))
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f(x)=\sqrt{\frac{x^{2}+6x+5}{x^{2}-2x+3}}
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f(x)=-1.5x
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f(x)=-1.5x
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intersección 2x
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intersección\:2x
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f(x)=sec((pix)/2)
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f(x)=\sec(\frac{πx}{2})
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y=e^{x-3}
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y=e^{x-3}
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g(x)=ln(2x+8)
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g(x)=\ln(2x+8)
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f(x)=(x+3)2-4
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f(x)=(x+3)2-4
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y=cos(arcsin(x))
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y=\cos(\arcsin(x))
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f(x)=(432+x^4)/(x^3)
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f(x)=\frac{432+x^{4}}{x^{3}}
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g(x)=e^{1-x}
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g(x)=e^{1-x}
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f(x)=-2x^2-12x+3
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f(x)=-2x^{2}-12x+3
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f(n)=5^{n+1}
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f(n)=5^{n+1}
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P(x)=x^2-x-6
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P(x)=x^{2}-x-6
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rango 3^{x+3}
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rango\:3^{x+3}
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y=|x-8|
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y=\left|x-8\right|
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y=-sqrt(-x)+1
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y=-\sqrt{-x}+1
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f(x)=2x^2-9x+10
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f(x)=2x^{2}-9x+10
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f(x)=3sqrt(x-3)
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f(x)=3\sqrt{x-3}
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f(θ)=cos(8θ)-cos(2θ)
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f(θ)=\cos(8θ)-\cos(2θ)
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y=1.5x+1
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y=1.5x+1
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y=(x-8)^2+3
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y=(x-8)^{2}+3
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f(x)=-x^2+8x+10
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f(x)=-x^{2}+8x+10
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y=x^4-18x^2+81
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y=x^{4}-18x^{2}+81
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f(x)=x*sqrt(3)
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f(x)=x\cdot\:\sqrt{3}
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inflection points x^4+2x^2
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inflection\:points\:x^{4}+2x^{2}
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f(U)=U
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f(U)=U
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f(x)=(x^3-3x+1)(x+2)
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f(x)=(x^{3}-3x+1)(x+2)
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y=(2/5)x+5
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y=(\frac{2}{5})x+5
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f(x)=25x^2-49
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f(x)=25x^{2}-49
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y=(2x-4)/(x^2-4)
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y=\frac{2x-4}{x^{2}-4}
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P(x)= 3/2 x^3+2x^2+1/2 x+1
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P(x)=\frac{3}{2}x^{3}+2x^{2}+\frac{1}{2}x+1
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f(x)=-x^2+8x-10
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f(x)=-x^{2}+8x-10
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f(x)=2x^2+4x-70
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f(x)=2x^{2}+4x-70
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f(x)=(x^2-5x)(cos(x))
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f(x)=(x^{2}-5x)(\cos(x))
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f(x)=-x-10
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f(x)=-x-10
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domínio-6cos(5y)
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domínio\:-6\cos(5y)
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y=cos(x-(3pi)/4)
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y=\cos(x-\frac{3π}{4})
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f(x)=(x+2)^{3/4}
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f(x)=(x+2)^{\frac{3}{4}}
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f(x)=((x-1)(x-3)^2(x+1)^2)/((x-2)(x+2)(x-1)(x+3))
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f(x)=\frac{(x-1)(x-3)^{2}(x+1)^{2}}{(x-2)(x+2)(x-1)(x+3)}
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f(x)=log_{24}(x)
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f(x)=\log_{24}(x)
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f(x)=(sqrt(2))/2
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f(x)=\frac{\sqrt{2}}{2}
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f(x)=e^{(((2x+5))/3)}\mod 3
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f(x)=e^{(\frac{(2x+5)}{3})}\mod\:3
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f(x)=-2-3x
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f(x)=-2-3x
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f(x)=sqrt((2x-5)/(x^2-5x+4))
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f(x)=\sqrt{\frac{2x-5}{x^{2}-5x+4}}
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y=sqrt(1-3x^2)
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y=\sqrt{1-3x^{2}}
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y=sqrt(2x-9)
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y=\sqrt{2x-9}
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domínio (sqrt(x))/(2x^2+x-1)
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domínio\:\frac{\sqrt{x}}{2x^{2}+x-1}
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f(x)=(4x+2)^2
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f(x)=(4x+2)^{2}
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x+1/x
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x+\frac{1}{x}
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f(x)=sqrt(-x^2+3x+4)
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f(x)=\sqrt{-x^{2}+3x+4}
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|
f(x)= 1/(sqrt(x^2+3))
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f(x)=\frac{1}{\sqrt{x^{2}+3}}
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|
f(x)=6x^7e^x
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f(x)=6x^{7}e^{x}
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|
y=-x^4+6x^2-4
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y=-x^{4}+6x^{2}-4
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|
y=(5000)/(1+49e^{-0.5x)}
|
y=\frac{5000}{1+49e^{-0.5x}}
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|
f(x)=(-4)/(x+4)
|
f(x)=\frac{-4}{x+4}
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|
y= 2/((x^3+x))
|
y=\frac{2}{(x^{3}+x)}
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|
y=-3x+13
|
y=-3x+13
|
|
recta m=-3/4 ,\at (-5,3)
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recta\:m=-\frac{3}{4},\at\:(-5,3)
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|
y=-3x+16
|
y=-3x+16
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|
f(x)=4x^3-33x^2+82x-61
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f(x)=4x^{3}-33x^{2}+82x-61
|
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y=e^{2x}sin(5x)
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y=e^{2x}\sin(5x)
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f(x)=sin(pi*x)
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f(x)=\sin(π\cdot\:x)
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