Sulfating is increased if a battery is left in a discharged state for extended periods of time.

Technician A says the 4R44E is a rear-wheel-drive transmission. Technician B says the 4L65-E is also a rear-wheel-drive transmission. Who is correct?

A. A only B. B only C. Both A and B D. Neither A nor B

Grapes grow best in a soil that has a pH range of _____

A) 4.5-7.0 B) 5.5-7.0 C) 6.5-7.0 D) 7.0-7.5

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

Rectangular plates are manufactured whose lengths are distributed and whose widths are distributed . Assume the lengths and widths are independent. The area of a plate is given by A = XY.

a. Use a simulated sample of size 1000 to estimate the mean and variance of A. b. Estimate the probability that P(5.9