02 संबंध एवं फलन
विविध अभ्यास
Question:
Let A={1,2,3,4},B={1,5,9,11,15,16} and f={(1,5),(2,9),(3,1),(4,5),(2,11)} Are the following true? (i) f is a relation from A to B (ii) f is a function from A to B Justify your answer in each case
Answer:
(i) True: f is a relation from A to B because it contains ordered pairs (1,5), (2,9), (3,1), (4,5), (2,11) which have elements from both A and B.
(ii) False: f is not a function from A to B because it contains more than one ordered pair with the same first element (2). This violates the definition of a function, which states that each element in the domain can only have one corresponding element in the range.
Question:
Let f be the subset of Z×Z defined by f={(ab,a+b):a,b∈Z}. Is f a function from Z to Z : justify your answer
Answer:
Answer: No, f is not a function from Z to Z. This is because, for any given element in Z, there may be more than one pair in f that satisfies the given condition. For example, if a = 2 and b = 3, then the pair (6,5) is an element of f. But if a = -2 and b = 3, then the pair (-6,1) is also an element of f. Since there are two pairs that satisfy the given condition, f cannot be a function from Z to Z.
Question:
Let f={(1,1),(2,3),(0,−1),(−1,−3)} be a function from Z to Z defined by f(x)=ax+b for some integers a,b. Determine a,b.
Answer:
- Substitute x=1 into the equation f(x)=ax+b.
- f(1)=a+b
- Since (1,1) is a point in the given set, a+b=1
- Substitute x=2 into the equation f(x)=ax+b.
- f(2)=2a+b
- Since (2,3) is a point in the given set, 2a+b=3
- Substitute x=0 into the equation f(x)=ax+b.
- f(0)=b
- Since (0,-1) is a point in the given set, b=-1
- Substitute x=-1 into the equation f(x)=ax+b.
- f(-1)=-a+(-1)
- Since (-1,-3) is a point in the given set, -a-1=-3
- Solve -a-1=-3 for a.
- a=-4
- Substitute a=-4 into a+b=1
- -4+b=1
- Solve -4+b=1 for b.
- b=5
- Therefore, a=-4 and b=5.
Question:
Let A={9,10,11,12,13} and let f:A→N be defined by f(n)= the highest prime factor of n. Find the range of f
Answer:
A = {9, 10, 11, 12, 13}
f(9) = 3 (the highest prime factor of 9) f(10) = 5 (the highest prime factor of 10) f(11) = 11 (the highest prime factor of 11) f(12) = 3 (the highest prime factor of 12) f(13) = 13 (the highest prime factor of 13)
Therefore, the range of f is {3, 5, 11, 13}.
Question:
Find the domain and range of the real function f defined by f(x)=∣x−1∣
Answer:
Domain: x ∈ (-∞,∞) Range: y ∈ [0,∞)
जेईई अध्ययन सामग्री (गणित)
01 सेट
02 संबंध एवं फलन
03 त्रिकोणमितीय फलन
04 गणितीय आगमन का सिद्धांत
05 सम्मिश्र संख्याएँ और द्विघात समीकरण
06 रैखिक असमानताएँ
07 क्रमचय और संचय
08 द्विपद प्रमेय
09 अनुक्रम और श्रृंखला
10 सीधी रेखाओं का अभ्यास
10 सीधी रेखाएँ विविध
11 शांकव खंड
12 त्रिविमीय ज्यामिति का परिचय
13 सीमाएं और डेरिवेटिव
14 गणितीय तर्क
15 सांख्यिकी
16 प्रायिकता