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If \( x2 = P \), where \( x < 2 \), then \( xP \) is greater than ____
The solution set for \( 3x2 \leq \dfrac{1}{2} \).
The solution of \(\dfrac{x}{3} > \dfrac{x}{2}+1 \),where \( x \), is a real _________
If \(2 < 2x1 < 2 \), then the value of \( x \) lies in the interval________
The solution of \( \left \dfrac{2}{x4} \right > 1 \), where \( x \neq 4 \) is ________
or
or
or
But
Find all pairs of consecutive odd natural numbers, both of which are larger than \( 10 \), such that their sum is less than \( 40 \).
Option satisfy the all the above conditions that and
Solve the inequality \( 32x \leq 9 \)
If \(x^2=4 \), then the value of \(x \) is_______
, Since and
So, No Solution is possible.
if \(\dfrac{x+3}{x2} > \dfrac{1}{2} \), then \( x \) lies in the interval_____
The interval in which \(f(x) = (x1) (x2)(x3) \) is negative is______
Now , when and .
If \(\dfrac{(x1)}{(x2)}\geq 0 \), where \( x \neq \pm 2 \), then the interval of \( x \) is_______
Given Let
So, or
or or
The solution of \(12 < \left( \dfrac{43x}{5}\right) < 2 \) is________
Solve: \(1 \leq x1 \leq 3 \)
or
or
What is the solution set for \(\dfrac{2(x1)}{5} \leq \dfrac{3(2+x)}{7} \)____
\(\)\therefore x \in [44, \infty) /latex]
Solve \(x: \dfrac{2x3}{3x7}> 0 \)
& or &
or
or
What is the solution set for \(\dfrac{x2}{x2} > 0 \)?
We have
Now
Which of the following is correct?
is correct option.
In the first three papers each of \(100 \) marks, Rishi got \( 95,72, 83 \) marks. If he wants an average of greater than or equal to \( 75 \) marks and less than \(80 \) marks, find the range of marks he should score in the \( 4 \text {th} \) paper.
Let Rishi secured mark in is .
Then
A man wants to cut three lengths from a single piece of board of length \( 91 \operatorname {cm} \). The second length is to be \( 3 \operatorname {cm} \) longer than the shortest and third length is to be twice as long as the shortest. What are the possible lengths for the shortest board if the third piece is to be at least \(5 \operatorname{cm} \) longer than the second?
Length of shortest piece
Then length of the and pieces are and respectively.
Also
The mark secured by Rohit in two tests were \( 65 \) and \( 70 \). Find the minimum marks he should score in the third test to have an average of at least \( 65 \) marks.
Let be the mark obtained by Rohit in test.
A soultion is to kept between \( 30 ^oC \) and \( 35 ^oC \). What is the range of temperature in degree Fahrenheit, if conversion formula is given by \( \operatorname {C} =\dfrac{5}{9} (\operatorname {F} 32) \), where \( \operatorname {C} \) and \(\operatorname {F} \) represent temperature in degree Celcius and degree Fahrenheit?
The longest side of a triangle is three times the shortest side and the third side is \(2 \operatorname {cm} \) shorter than the longer side if the perimeter of the triangle at least \( 61 \operatorname{cm}\), find the minimum length of the shortest side.
Let the shortest side is length of the longest side is and the length of the third side is .
Given that \( x \) is an integer, find the values of \( x \) which satisfy both \( 2x +3 > 7 \) and \( x+4 < 10 \)
The solution for the simultaneous linear inequalities \( 2x 3 \leq 7 \) and \( x \leq 2 \) is______