if a b b c c II d and d e which is not true
It is not true that "b" equals "c" or "d".
The given information is: a b b c c II d and d e. We need to identify the statement that is not true.
Let's break down the given information step-by-step:
1. a b b c c II d: This suggests that a is followed by two b's, two c's, and then d.
2. d e: This suggests that d is followed by e.
Now, let's determine which statement is not true:
Based on the given information, there is nothing explicitly mentioned about the relationship between a and e. Therefore, we can conclude that the statement "a e" is not true since there is no evidence to support a direct relationship between a and e.
Hence, the statement "a e" is not true.
To determine which statement is not true, let's analyze the given information step by step:
1. "a b b c c II d": This indicates that there are two instances of 'b', two instances of 'c', and one instance of 'a' and 'd'. The phrase "II" may represent the Roman numeral "2."
2. "d e": This indicates that there is one instance of 'd' and one instance of 'e'.
Now, let's compare the information given and evaluate each statement:
a) There are two instances of 'b'.
b) There are two instances of 'c'.
c) There is one instance of 'a'.
d) There is one instance of 'd'.
e) There is one instance of 'e'.
To determine which statement is not true, we can observe that all the statements correspond to the given information except statement "b" ("There are two instances of 'c'"). The given information suggests that there are only two instances of 'b', not two instances of 'c'. Therefore, statement "b" is not true.
So, the answer is statement "b": "There are two instances of 'c'."