The strength of a beam is proportional to the width and the square of the depth. A beam is cut from a cylindrical log of diameter d = 28 cm. The figures show different ways this can be done. Express the strength of the beam as a function of the angle θ in the figures. (Use k as your proportionality constant.) s(θ)=
The strength of a beam is proportional to the width and the square of the depth. A beam is cut from a cylindrical log of diameter d = 28 cm. The figures show different ways this can be done. Express the strength of the beam as a function of the angle θ in the figures. (Use k as your proportionality constant.) s(θ)=
The strength of a beam is proportional to the width and the square of the depth. A beam is cut from a cylindrical log of diameter d = 28 cm. The figures show different ways this can be done. Express the strength of the beam as a function of the angle θ in the figures. (Use k as your proportionality constant.) s(θ)=
The strength of a beam is proportional to the width and the square of the depth. A beam is cut from a cylindrical log of diameter d = 28 cm. The figures show different ways this can be done. Express the strength of the beam as a function of the angle θ in the figures. (Use k as your proportionality constant.)
s(θ)=
Expression, rule, or law that gives the relationship between an independent variable and dependent variable. Some important types of functions are injective function, surjective function, polynomial function, and inverse function.
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