Make t the subject of formula \(k = m\sqrt{\frac{t-p}{r}}\)
Solve the equation \(3y^2\) = 27y
Find the value of x such that the expression \(\frac{1}{x}+\frac{4}{3x}-\frac{5}{6x}+1\) equals zero
Given that p varies directly as q while q varies inversely as r, which of the following statements is true?
In the diagram, PQS is a circle with center O. RST is a tangent at S and ∠SOP = 96o. Find ∠PST
