I. Write T if the given statement is true with respect to the underlined term(s); otherwise, write the term(s) that will make the statement true. 6. Let A = {x € IR | x² = 64 }. Then, |P(A)| 7. Let D = {x € Q|x² = 5 }. Then, 8. Let H = {x € R| – 1< x <1}. Then, H is finite. 9. If E = {x € Z | – 2< x < 1}, then, E is empty. 16. is singleton. 10. If L = {3* |x = 1, 2, 3, 4, 5 }, then L is an infinite set. %3D

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I. Write T if the given statement is true with respect to the underlined term(s); otherwise, write the term(s) that will make the statement true. 6. Let A = {x € R | x² = 64}. Then, |P(A)| = 16. 7. Let D = {x € Q|x² = 5}. Then, D is singleton. 8. Let H = {x € R| –1<x<1}. Then, H is finite. %3D 9. If E = {x € Z| – 2< x < 1}, then, E is empty. 10. If L = {3* |x = 1, 2, 3, 4, 5 }, then L is an infinite set.