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ид С2 at (5) а ду ә (6) д 7 Әr! д ay' а д! а Y де (7) дz а at — и а д" (8) Hint: you need to use the chain rule. 3) (2 marks) Write down analogous expression to equations (5)-(8), assuming a Galilean transformation: x' = x – ut, y' = y, z' = z and t' = t.
(Hz CH3 I Cexcers) 2) лого нао 1)CH₂ I (excess) - си, 2) 2 - 3 ICH₃ I. mcPPA си с из сен и 2. А
how many dipoles are present
а и СЕС но (1)
Derive the inverse Lorentz transformation for the partial deriva- tives, (5 и д с2 Әt! (5) (6) а дх а ду а дz а Әt д 7 Әr? ә ay' а дz! а 7 де? (7) ә - (8) Әr! Hint: you need to use the chain rule. Write down analogous expression to equations (5)-(8), assuming a Galilean transformation: x = x – ut, y' = y, z' = z and t = t.
А С
H2O2 k) I + ВН, NaOH
H2O2 k) H + BHZ NaOH
(3 points.) Prove that the following properties hold in any vector space: (1) (-с)и %— — (си). (i) —(-и) %— (iii) (0)(x)= 0 и.
3. Convert the following Fischer projection to Haworth projections си, •Н о НО. -Н по Н H -ой сной 4. Identify the glycosidic linkage in the following compounds. che 1 chte ok ol и и ol и но и on h on che oll CH2OH 얻 on Н 애 к до н. и ои
Name the following compounds
С НО H А. ну-