# Jambmaths

Maths Question | |
---|---|

Question 1 |
Evaluate $1011_{2}^{2}-101_{2}^{2}$ |

Question 2 |
If |

Question 3 |
Simplify $\tfrac{3}{5}\div (\tfrac{2}{7}\times \tfrac{4}{3}\div \tfrac{4}{9})$ |

Question 4 |
Evaluate $\frac{{{(0.5625)}^{2}}-{{(0.4375)}^{2}}}{0.04}$ correct to 3 significant figures |

Question 5 |
A man made a profit of 5%when he sold an article for N60, 000. How much would he have to sell the article to make a profit? |

Question 6 |
The sum of the ages of Musa and Lawal is 28 years. After sharing a certain sum of money in the ratio of their ages, Musa get N600 and Lawal N800. How is old is Lawal? |

Question 7 |
Find the value of x for which $2({{3}^{2x-1}})=162$ |

Question 8 |
If${{\log }_{10}}2=x,$express ${{\log }_{10}}12.5$in terms of |

Question 9 |
Find |

Question 10 |
Given |

Question 11 |
If |

Question 12 |
Make |

Question 13 |
Factorize $2{{t}^{2}}+t-15$ |

Question 14 |
The graph above is represented by |

Question 15 |
$W\propto {{L}^{2}}$and |

Question 16 |
The solution of the quadratic inequality is $({{x}^{2}}+x-12)\ge 0$is |

Question 17 | |

Question 18 |
The |

Question 19 |
Find the sum to infinity of the series $2+\tfrac{3}{2}+\tfrac{9}{8}+\tfrac{27}{32}+---$ |

Question 20 |
A binary operation $\oplus $ on real numbers is defined by $x\oplus y=xy+x+y$for any two real numbers |

Question 21 |
Question 21 |

Question 22 |
$\left( \begin{matrix} 3 & -2 \\ -7 & 5 \\\end{matrix} \right)+2\left( \begin{matrix} -2 & 4 \\ 3 & -1 \\\end{matrix} \right)$ |

Question 23 |
If |

Question 24 |
If the lines $2y-kx+2=0$and $y+x-\tfrac{k}{2}=0$intersect at (1, – 2). Find the value of |

Question 25 |
Find the size of each exterior angle of a regular octagon |

Question 26 |
In the parallelogram |

Question 27 |
The area of a square is 144sq.cm, find the length of the diagonal |

Question 28 |
Calculate the length of an arc of a circle of diameter 14cm which subtends an angle of 90 |

Question 29 |
The volume of hemispherical bowl is 718$\tfrac{2}{3}$ cm. Find its radius |

Question 30 |
Find the locus of the points equidistant from two straight line lines $y-5=0$ and $y-3=0$ |

Question 31 |
A particle moves P between points S and T such that SPT is always constant. Find the locus of |

Question 32 |
What is the value of |

Question 33 |
If the lines $3y=4x-1$and $qy=x+3$are parallel to each other, the value of |

Question 34 |
Find the value of $\frac{\tan {{60}^{o}}-\tan {{30}^{o}}}{\tan {{60}^{o}}+\tan {{30}^{o}}}$ |

Question 35 |
A man 40 |

Question 36 |
If $y=x\cos x$find $\frac{dy}{dx}$ |

Question 37 |
If $y={{(1+x)}^{2}},$find $\frac{dy}{dx}$ |

Question 38 |
Find the value of |

Question 39 |
Integrate $\frac{{{x}^{2}}-\sqrt{x}}{x}$ with respect |

Question 40 |
Determine the value of $\int\limits_{0}^{\tfrac{\pi }{2}}{(-2\cos x)dx}$ |