Suppose that j(x) = h¯¹ (x) and that both j and h are defined for all values of x. Let h(6) = 4 and j(9) = -3. Evaluate if possible and enter the value of the expression in the blank. If you do not have enough given information to evaluate the expression, enter unknown in the blank beside the expression. (a) h(j(6)) = (b) j(h(6)) = (c) h-¹(-3) = (d) j(6) = (e) h(9) = (f) j-¹(-3) = (g) j(4) = (h) (h(4))-¹; = (i) (h(-3))-¹ =

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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Suppose that j(x) = h-¹(x) and that both j
and h are defined for all values of x. Let h(6) = 4 and
j(9) = -3. Evaluate if possible and enter the value of
the expression in the blank. If you do not have enough
given information to evaluate the expression, enter
unknown in the blank beside the expression.
(a) h(j(6)) =
(b) j(h(6)) =
(c) h-¹(-3) =
(d) j(6) =
(e) h(9) =
(f) j-¹(-3) =
(g) j(4) =
(h) (h(4))-¹ =
(i) (h(-3))-¹ =
Transcribed Image Text:Suppose that j(x) = h-¹(x) and that both j and h are defined for all values of x. Let h(6) = 4 and j(9) = -3. Evaluate if possible and enter the value of the expression in the blank. If you do not have enough given information to evaluate the expression, enter unknown in the blank beside the expression. (a) h(j(6)) = (b) j(h(6)) = (c) h-¹(-3) = (d) j(6) = (e) h(9) = (f) j-¹(-3) = (g) j(4) = (h) (h(4))-¹ = (i) (h(-3))-¹ =
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