Question 1
Rank the indicated C–C bonds in increasing order of bond length.
![](data:image/png;base64, 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)
◦ II < IV < III < I
◦ III < I < IV < II
◦ IV < II < I < III
◦ III < I < II < IV
◦ I < II < III < IV
Question 2
Following is the structure for Propranolol, an antihypertensive drug. Identify the hybridization state, molecular geometry and approximate bond angle at the indicated oxygen atom in Propranolol.
![](data:image/png;base64, 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)
◦
sp3, tetrahedral, 109.5°
◦
sp2, bent, 120°
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sp2, bent, 180°
◦
sp2, tetrahedral, 109°
◦
sp3, bent, ~109.5°