Ask Question
9 March, 13:12

Which of the following subsets of P2P2 are subspaces of P2P2? A. p′ (t) p (t) B. p (t) C. p (t) p′ (6) = p (7) D. ∫10p (t) dt=0 ∫01p (t) dt=0 E. p′ (t) + 2p (t) + 8=0p (t) F. p (t) p (t)

+2
Answers (1)
  1. 9 March, 14:59
    0
    The correct options are;

    E. p (t) p (t)

    F. p (5) = 6 p (5) = 6

    Step-by-step explanation:

    A. P (t) is constant is given by

    P (t) = a+bt+ct^2

    P' (t) = b + 2ct which is not a constant, therefore

    P (t) is not a subspace of P2

    B. p (t)

    Here, we have

    P (t) = a+bt+ct^2 and

    P (-t) = a-bt+ct^2

    P (t) is not equal to P (-t)

    Therefore p (-t) = p (t) p (-t) = p (t) for all tt is not a subspace of P2

    C. p (t) p′ (6) = p (7)

    p' (t) = b+ct and p′ (6) = b+6c

    p (7) = a+7b+49c

    Therefore

    p′ (6) is not equal to p (7) and

    p (t) p′ (6) = p (7) is not a subspace of P2

    D. ∫10p (t) dt=0p (t)

    ∫10p (t) dt

    = at+0.5*bt^2 + (ct^3) / 3

    = a + 0.5b+cr/3 which is not equal to 0

    Therefore

    p (t) ∫01p (t) dt=0 is not a subspace of P2

    E. p′ (t) + 2p (t) + 8=0p (t)

    Here, we have

    p′ (t) + 2p (t) + 8=0 given by

    b+2c+2 (a+bt+ct^2) + 8=0 ... (1)

    When t=2, we have

    a = - (16+5b+4c) / 2

    Substituting the value of a into the equation (1), and simplying we have

    (2t-4) * b + (2t-4) * c + 2t^2-8=0

    Therefore when t=2 the above equation = 0

    Hence

    p′ (t) + 2p (t) + 8=0 p′ (t) + 2p (t) + 8=0 is a subspace of P2

    F. p (5) = 6p (t)

    Here we have

    p (t) = a+bt+ct^2

    p (5) = a+5b+25c = 6

    a=6-5b-25c

    Substitution gives

    6-5b-25c+bt+ct^2

    Which gives on factorization

    (t-5) b + (t^2-25) c+6 which is equal to 6 when t=5

    Therefore

    p (t) p (5) = 6 is a subspace of P2
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “Which of the following subsets of P2P2 are subspaces of P2P2? A. p′ (t) p (t) B. p (t) C. p (t) p′ (6) = p (7) D. ∫10p (t) dt=0 ∫01p (t) ...” in 📘 Mathematics if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers