Fischer Projection Model Previously Constructed red red yellow - - blue yellow blue green green Referring...
questions 9 and 10 austereomers, stereoisomers that are not related as mirror images. 9. Take the new model you constructed in no. 8 and projects project it into a mirror. Construct a model of the image in the mirror. Are the two models superimposable (9a)? What term describes the relations the two models (9b)? Thus if we let these three models represent different isomers of tartaric acid, we find that there are three stereoisomers for tartaric aci form and a...
19-26 thanks! 19-29* PART 3: 2,3-BUTANEDIOL CH-CH(OH)-CH(OH)-CH, mirror images, not superimposable Build as many models of 2,3-butanediol as you can. First, attach two carbons with a single bond. To each carbon add one carbon, one hydrogen, and one oxygen. To complete the structure, Ti the remaining hydrogen atoms. Remember, a model is not different if it is completely superimposable on one already constructed! 13. How many stereochemically different models are possible for 2,3-butanediol? 14. What characteristic does one of these...
rojection Formulas for each model in #16 (again orient the carbon chain up and down). Are the mirror images "superimposable?" Interchange any two of the groups located at one of the chiral centers on one of the models in # 1 6. What is the stereochemical relationship of the resulting structure with the one that used to be its mirror image? Will this 'new' model be "optically active?" Why or why not? 18. PART 4:2,3-DICHLOROPENTANE CH, CH(C)-CHC)-CH2CH Build a model...
1. Consider an urn with 4 blue balls, 6 red balls, and 3 yellow balls. Suppose we draw 4 balls at random. (a) How many elements are in the sample space? (b) What is the probaiblity that we draw 4 red balls? (c) What is the probability that we draw 2 red balls and 2 blue balls? (d) What is the probability that we draw either 3 blue and 1 yellow ball or 1 blue and 3 yellow balls? 2....
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 o 0.05 level of significance EEB Click the icon to view the...