Question: Let f(t) and g(t) be continuous functions and the corresponding area accumulation functions ....Which one of the following statements most completely describes what is true
Let f(t) and g(t) be continuous functions and the corresponding area accumulation functions ....Which one of the following statements most completely describes what is true for A(x) and/or B(x)?
3 pts Let f(t) and g(t) be continuous functions and the corresponding area accumulation functions A(z) = [# f(t) at and B(z) = ff g(t) at . Which ONE of the following statements most completely describes what is true for A ( ) and/or B(x) ? O If f(t) > g(t) for all t > 1 then A(x) > B(x) O TWO of the numeric claims are TRUE and TWO of the numeric claims are FALSE A(x) + B(x) = [f(t) + 9(t)] at O A@) f (t ) B(a) dt provided g(t) * 0 for allt > 1 g ( t ) ALL four of the numeric claims are in fact TRUE A(x) B(z) = f(t)g(t) at O ALL four of the numeric claims are in fact FALSE
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