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Mathsproject

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11 views2 pages

Mathsproject

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demoacc.pbs
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We take content rights seriously. If you suspect this is your content, claim it here.
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MATHS PROJECT(2024-25)

Submitted by : AYUSH KESHRI(XII)


Roll no.:

Teacher’s signature

Examiner’s signature Principal’s signature


INDEX
1.To verify that the relation R in the set L of all
lines in a plane, defined by R = {(l, m) : l ⊥ m} is
symmetric but neither reflexive nor transitive.

2.To verify that the relation R in the set


R = {( l, m) : l || m} is an equivalence relation.

3. To demonstrate a function which is not one-one


but is onto.

4. To demonstrate a function which is one-one but


not onto.

5. To find analytically the limit of a function f (x)


at x = c and also to check the continuity of the
function at that point.

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