(Round to two decimal places as needed.) What is the test statistic? Color = Frequency Claimed Proportion (Round to three decimal places as needed.) What is the P-value of the test? P-value = (Round to three decimal places as needed.) Based on the results, do the colors follow the same distribution as stated in the problem? OA. Do not reject Ho. There is sufficient evidence that the distribution of colors is not the same as stated by the manufacturer. OB. Do not reject Ho. There is not sufficient evidence that the distribution of colors is not the same as stated by the manufacturer OC. Reject Ho. There is sufficient evidence that the distribution of colors is not the same as stated by the manufacturer. OD. Reject Ho. There is not sufficient evidence that the distribution of colors is not the same as stated by the manufacturer. Click to select your answer(s).A manufacturer of colored candies states that 13% of the candies in a bag should be brown, 14% yellow, 13% red, 24% blue, 20% orange, and 16% green. A student randomly selected a bag of colored candies, He counted the number of candies of each color and obtained the results shown in the table. Test whether the bag of colored candies follows the distribution stated above at the 0t= 0.05 level of signicance. a Click the icon to view the table. Determine the null and alternative hypotheses. Choose me correct answer belowt -' A. H0: The distribution of colors is the same as stated by the manufacturer. H': The distribution of colors is not the same as stated by the manufacturer. 0 Observed Distribution of Colors B. Ho: The distribution of colors is not the same as stated by the manufacturer. H1: The distribution of colors is the same as stated by the manufacturer. C. None of these. Colored Candies in a bag Color Brown Yellow Red Blue Compute the expected counts for each color. Frequency 62 65 55 61 Color Observed Count Expected Count Claimed Proportlon 0.13 0.14 0.13 0.24 Brown 62 Yellow 65 Red 55 Print Blue 61 Orange 95 Green 63 (Round to two decimal places as needed.)