Question
In the equation
The value of x is :
- 1
![negative 1](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAABcAAAANCAYAAABCZ/VdAAAACXBIWXMAAA7EAAAOxAGVKw4bAAAABGJhU0UAAAAMyZLetQAAADBJREFUeNpjYKAcqAFxLRBfYKABWAzEaUD8n4GGYNRw0g3/TwQeDfMRYDipEU8dAADUJhpljLE7wQAAAFN0RVh0TWF0aE1MADxtYXRoIHhtbG5zPSJodHRwOi8vd3d3LnczLm9yZy8xOTk4L01hdGgvTWF0aE1MIj48bW8+LTwvbW8+PG1uPjE8L21uPjwvbWF0aD5mjCijAAAAAElFTkSuQmCC)
- 0
- 2
The correct answer is: 0
Related Questions to study
If
then the value(s) of
is are
If
then the value(s) of
is are
From a high tower at time
, one stone is dropped from rest and simultaneously another stone is projected vertically up with an initial velocity. The graph of the distance
between the two stones, before either his the ground, plotted against time
will be as
From a high tower at time
, one stone is dropped from rest and simultaneously another stone is projected vertically up with an initial velocity. The graph of the distance
between the two stones, before either his the ground, plotted against time
will be as
Let M and N be two 3×3 non- singular symmetric matrices such that MN
NM .If
denotes the transpose of the matrix P, then
is equal to
Let M and N be two 3×3 non- singular symmetric matrices such that MN
NM .If
denotes the transpose of the matrix P, then
is equal to
If A is 3×3 non-singular matrix then ![d e t invisible function application open parentheses A to the power of negative 1 end exponent a d j A close parentheses equals](data:image/png;base64,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)
If A is 3×3 non-singular matrix then ![d e t invisible function application open parentheses A to the power of negative 1 end exponent a d j A close parentheses equals](data:image/png;base64,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)
If cos3A + cos3B + cos3C =1 then one of the angles of ΔABC is
If cos3A + cos3B + cos3C =1 then one of the angles of ΔABC is
Let points A(7, 5), B(2, 1), C(10, 3) the vertices of a ΔABC. I is incentre of ΔABC. E and D are points of contact of incircle and sides AC and BC of ΔABC respectively. If G is the intersection points of angle bisector of ΔB and line joining ED. Then angle between line AG and BG is
Let points A(7, 5), B(2, 1), C(10, 3) the vertices of a ΔABC. I is incentre of ΔABC. E and D are points of contact of incircle and sides AC and BC of ΔABC respectively. If G is the intersection points of angle bisector of ΔB and line joining ED. Then angle between line AG and BG is
In a ΔABC as in given figure
and
find the ratio of ![fraction numerator capital delta P A E over denominator capital delta P B D end fraction](data:image/png;base64,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)
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/474983/1/947918/Picture38.png)
In a ΔABC as in given figure
and
find the ratio of ![fraction numerator capital delta P A E over denominator capital delta P B D end fraction](data:image/png;base64,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)
![](https://mycourses.turito.com/pluginfile.php/1/question/questiontext/474983/1/947918/Picture38.png)
If
then
=
If
then
=
If the acceleration of the elevator
, then
![](data:image/png;base64,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)
If the acceleration of the elevator
, then
![](data:image/png;base64,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)
Which of the following options is correct for the object having a straight line motion represented by the following graph?
![](data:image/png;base64,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)
Which of the following options is correct for the object having a straight line motion represented by the following graph?
![](data:image/png;base64,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)
The principal value of
where
is
The principal value of
where
is
In the arrangement shown in figure all surfaces are smooth. Select the correct alternative(s)
In the arrangement shown in figure all surfaces are smooth. Select the correct alternative(s)
If
then
= - ... -
If
then
= - ... -
In the pulley system shown in figure the movable pulleys A,B and C are of mass 1 kg each. D and E are fixed pulleys. The strings are light and inextensible. Choose the correct alternative(s). All pulleys are frictionless.
In the pulley system shown in figure the movable pulleys A,B and C are of mass 1 kg each. D and E are fixed pulleys. The strings are light and inextensible. Choose the correct alternative(s). All pulleys are frictionless.