(1 point)CAUTION: You have ten attempts to submit an answer for this problem. Make sure you have answered allthe parts before pressing "Submit".Analyze each of the following attempted proofs, and decide if the given argument is correct or incorrect.Each of the given statements appeals to the Comparison Test (and NOT the Limit Comparison Test.)Note: If the conclusion is true but the justification provided is flawed, the appropriate answer is"Incorrect".an3,01n2-6<1n2, and the series n=11n2 converges, soby the Comparison Test, theseries n=11n2-6 converges.bn>2,log(n)n2>1n20, and the series n=11n2 converges, soby the Comparison Test, theseries n=2log(n)n2 converges.cn>1,01nlog(n)<2n, and the series 2n=11n diverges, soby the Comparison Test, theseries n=21nlog(n) diverges.dn>2,n+12n>1n0, and the series n=11n diverges, soby the Comparison Test, theseries n=1n+12n diverges.en>1,0arctan(n)n3<2n3, and the series 2n=11n3 converges, soby the ComparisonTest, the series n=1arctan(n)n3 converges.fn>1,n6-n3<1n2, and the series n=11n2 converges, soby the Comparison Test, the seriesn=1n6-n3 converges.