The A, E, B, and O horizons make up the solum, which contains the most plant roots

Indicate whether the statement is true or false.


T

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Which organelle is a network of double membranes positioned throughout the cell and transports material?

a. Microtubules c. Golgi apparatus b. Vacuoles d. Endoplasmic reticulum

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Technician A says power can be locked into all four wheels merely by turning the locking hubs into the locked position. Technician B says some transfer cases use an electric switch to engage 4WD. Who is correct?

A. A only B. B only C. both A and B D. neither A nor B

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