A) If two triangles are not similar, then these are not identical
B) If two triangles are not identical, then these are not similar
C) If two triangles are not identical, then these are similar
D) If two. triangles are not similar, then these are identical
Correct Answer: A
Solution :
Consider the following statements p : Two triangles are identical q : Two triangles are similar Clearly, the given statement in symbolic form is \[p\to q\]. \[\therefore \] Its contrapositive is given by \[\sim q\to \sim p\] Now, \[\sim p:\] two triangles are not identical \[\sim q:\] two triangles are not similar \[\therefore \,\,\sim q\to \,\sim \,p:\] If two triangles are not similar, then these are not identical.You need to login to perform this action.
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