Simplify ${{\left( \sqrt[3]{64{{a}^{3}}} \right)}^{-1}}$

A car dealer bought a second – hand car for N250,000 and spent N70,000 refurbishing it. He then sold the car for N400,000. What is the percentage gain?

Find the principal which amount to N5,500 at simple interest in 5 years at 2% per annum.

Divide a^3x – 26a^2x + 156a^x – 216 by a^2x – 24a^x + 108

The identity element with respect to the multiplication shown in the table above is

If $P=\left( \begin{matrix}   3 & -2 & 4  \\   5 & 0 & 6  \\   7 & 5 & -1  \\\end{matrix} \right)$ then –2p is 

if two graph $y=p{{x}^{2}}+q$ and $y=2{{x}^{2}}-1$intersect at x = 2. Find the value of p in terms of q

Evaluate $\left| \begin{matrix}   -1 & -1 & -1  \\   3 & 1 & -1  \\   1 & 2 & 1  \\\end{matrix} \right|$

An operation *is defined on the set of real numbers by a * b  = a + b + 1. If the identity element is –1 . Find the inverse of the element 2 under the operation

Factorize $4{{x}^{2}}-9{{y}^{2}}+20x+25$

A point P moves such that it is equidistance from Q and R. Find QR when PR =8cm and $\angle PRQ={{30}^{o}}$

A straight line makes an angle of 30^o with the positive x – axis and cut the y – axis at y =5. Find the equation of the straight line

Find the number of sides a regular polygon whose interior angle is twice the exterior angle

The bearing of P and Q from a common point N are 020^o and 300^o respectively. If P and Q are also equidistance from N, find the bearing of P from Q

Find the locus of a point which moves such that its distance from the line y = 4 is a constant

In the figure above, PQR is a straight line segment, PQ = QT . Triangle PQT is an isosceles triangle. $\angle QPT$is 25^o . Calculate the value of $\angle RST$

Evaluate $\int{2{{(2x-3)}^{\tfrac{2}{3}}}dx}$

Find the area bounded by the curve $y=4-{{x}^{2}}$and $y=2x+1$

If $y=x\sin x$ find $\frac{dy}{dx}$ when $x=\tfrac{\pi }{2}$