Question 1 :
Solve 9x - 4y = 8 & 13x + 7y = 101
Question 2 :
Solve 3x + 2y + 25 = 0 & x + y + 15 = 0
Question 4 :
If $$\dfrac { x }{ 3 } =\dfrac { 16 }{ y } =4$$, then $$x+y=$$
Question 6 :
If the sum of two adjacent angles is $$100^{\circ}$$ and one of them is $$35^{\circ}$$, then the other is :<br>
Question 7 :
Two angles measure $$(30-a)^0$$ and $$(125+2a)^0$$. If each one is the supplement of the other, then the value of a is :
Question 8 :
$$D$$ and $$E$$ are points on the sides $$AB$$ and $$AC$$ respectively of $$\triangle ABC$$. For the following case, state whether $$DE\parallel BC$$:<br/><br/>$$AB=10.8cm,  AD=4.5cm, AC=4.8cm$$ and $$AE=2.8cm$$
Question 10 :
The supplement angleof the complement of$$\displaystyle { 30 }^{ o }$$ is
Question 12 :
The number of real roots of $${ \left| x \right| }^{ 2 }-5\left| x \right| +6=0$$ is
Question 13 :
Find, whether each of the followings is a terminating or a non-terminating decimal.$$7 \div 11$$.
Question 19 :
Convert the following fraction into simple decimal recurring form.$$\displaystyle \frac{1}{6}$$= ?
Question 20 :
Solve for x :$$\displaystyle 2^{5x - 1} = 4 \times 2^{3x + 1}$$<br/>
Question 21 :
The value of (a - b)(a$$^2$$ + ab + b$$^2$$) is
Question 22 :
State whether True or False.Divide : $$a^2 +7a + 12 $$ by $$  a + 4 $$, then the answer is $$a+3$$.<br/>
Question 24 :
The remainder when the polynomial $$p(x) = x^{100} -x^{97} + x^3$$ is divided by $$x + 1$$ is
Question 27 :
Find the expression which is equivalent to : $$\displaystyle \frac { { x }^{ 3 }+{ x }^{ 2 } }{ { x }^{ 4 }+{ x }^{ 3 } } $$?
Question 28 :
Factors of $$\left (x^{2} + \dfrac {x}{6} - \dfrac {1}{6}\right )$$ are
Question 29 :
If one of zeroes of the cubic polynomial $${x^3} + a{x^2} + bx + c\,\,\,$$ is -1 , then the product of the other two zeroes is <br/>
Question 30 :
Find out whether or not the first polynomial is a factor of the second polynomial:$$4a-1, 12a^2-7a-2$$
Question 31 :
The coordinates of a point, lies on $$x$$-axis and is at a distance of $$3$$ units to the left of the origin is _____.
Question 36 :
It is not possible to construct a triangle when its sides are :<br>
Question 37 :
Assertion: If two triangles are congruent, then their corresponding angles are equal
Reason: Two congruent triangles have same area
Question 38 :
Can $$6$$ cm, $$5$$ cm and $$3$$ cm form a triangle?
Question 39 :
Which of the following sets of side lengths form a triangle?
Question 40 :
In a triangle ABC , if AB , BC and AC are the three sides of the triangle , then which of the following statements is necessarily true ?
