Let f be an entire function with the property that If(2)l> 7 for all complex numbers z. Then * None of these such a function does not exist f is a polynomial of degree greater than or equal1 O fis an exponential function O fis a constant function 4z2+4 Let C: z+1|=4 and I = 9c z²–1 dz. Then None of these |=-2nti O l=0 by Cauchy-Goursat Theorem I=2ni I=0 (without applying Cauchy-Goursat Theorem) I=4nti

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Let f be an entire function with the property that If(2)l> T for all complex numbers z. Then None of these such a function does not exist f is a polynomial of degree greater than or equal 1 f is an exponential function a constant function 4z2+4 Let C: |z+1=4 and I = 6. dz. Then z2-1 None of these |=-2ni I=0 by Cauchy-Goursat Theorem |=2ri I=0 (without applying Cauchy-Goursat Theorem) |=4rti