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When are vectors $\boldsymbol{v,\;w}$ orthogonal?

Developing concepts for shear and bending moment diagrams. 

Concept check on sign convention for shear and bending moment diagrams

Determine expressions for internal shear and bending moment as a function of $x$ for a beam with two vertical loads.

Shear and bending moment diagrams involving concentrated moments.

Shear and bending moment problems involving distributed loads.

Simply supported Beam with three concentrated loads.

Homeworks 36, 37, 38 and 39 don't resume properly in Numbas LTI, so broken into individual problems.

Derive the expressions for the shear and bending moment as functions of $x$ for a cantilever beam with a uniformly varying (triangular) load.

Questions on integration using various methods such as parts, substitution, trig identities and partial fractions.

This really is my first exam.

This is my first question.

Application of the power rule for differentiation for a positive integer power.

Find $\displaystyle \int x(a x ^ 2 + b)^{m}\;dx$

Rearrange some expressions involving logarithms by applying the relation $\log_b(a) = c \iff a = b^c$.

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Obligatoriske oppgaver for uke 3

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