Statement 1: $C H subscript 3 end subscript superscript minus end superscript$ adds to C=0 group irreversibly but $C N to the power of minus end exponent$ ion adds reversibly
Statement 2: $C H subscript 3 end subscript superscript minus end superscript$ ion is much stronger nucleophile than $C N to the power of minus end exponent$ ion

Consider the following isomers of [Co(NH₃)₄Br₂]⁺. The black sphere represents Co, gray spheres represent NH₃ and unshade spheres represent Br.

Which structures are identical?

Consider the following isomers of [Co(NH₃)₄Br₂]⁺. The black sphere represents Co, gray spheres represent NH₃ and unshade spheres represent Br.

Which of the following are trans-isomers?

Consider the following isomers of [Co(NH₃)₄Br₂]⁺. The black sphere represents Co, gray spheres represent NH₃ and unshade spheres represent Br.

Which of the following are cis-isomers?

The incentre of the triangle formed by the links x=0, y=0 and 3x+4y=12 is at

In order to answer this question, we used the formula for the coordinates of a triangle's in-center when the lengths of its sides a, b, and c are known, as well as the coordinates of its vertices. The incentre is (1,1).

The incentre of the triangle formed by the links x=0, y=0 and 3x+4y=12 is at

Two vertices of a triangle are (3,-2) and (-2,3) and its orthocentre is (-6,1). Then its third vertex is

2x+y-4=0 and the x-y+7=0 are the equations that pass through the third vertex.

Two vertices of a triangle are (3,-2) and (-2,3) and its orthocentre is (-6,1). Then its third vertex is

2x+y-4=0 and the x-y+7=0 are the equations that pass through the third vertex.

If in triangle $ABC comma straight A identical to left parenthesis 1 comma 10 right parenthesis$ , circumcenter $identical to open parentheses negative 1 third comma 2 over 3 close parentheses$ and orthocenter $identical to open parentheses 11 over 3 comma 4 over 3 close parentheses$ then the co-ordinates of mid-point of side opposite to is :

>>> The orthocenter, centroid and circumcenter of any triangle are collinear. And the centroid divides the distance from orthocenter to circumcenter in the ratio $2 : 1$ .
>>> Also, the centroid $(G)$ divides the medians $(A D)$ in the ratio $2 : 1.$
>>> ∴D(h, k)=(1, $negative 11 over 3$ )

If in triangle $ABC comma straight A identical to left parenthesis 1 comma 10 right parenthesis$ , circumcenter $identical to open parentheses negative 1 third comma 2 over 3 close parentheses$ and orthocenter $identical to open parentheses 11 over 3 comma 4 over 3 close parentheses$ then the co-ordinates of mid-point of side opposite to is :

maths-

A triangle ABC with vertices A(-1,0), B(-2,3/4)&C(-3,-7/6) has its orthocentre H. Then the orthocentre of triangle BCH will be

maths-General

ABC is an equilateral triangle such that the vertices B and C lie on two parallel lines at a distance 6 If A lies between the parallel lines at a distance 4 from one of them then the length of a side of the equilateral triangle is

$>>> a c o s θ = 6$ ----(1)
$>>> a(s i n (30 - θ)) = 4$ ----(2)
>>> a = $fraction numerator 4 square root of 7 over denominator square root of 3 end fraction$

ABC is an equilateral triangle such that the vertices B and C lie on two parallel lines at a distance 6 If A lies between the parallel lines at a distance 4 from one of them then the length of a side of the equilateral triangle is

$>>> a c o s θ = 6$ ----(1)
$>>> a(s i n (30 - θ)) = 4$ ----(2)
>>> a = $fraction numerator 4 square root of 7 over denominator square root of 3 end fraction$

If the point $left parenthesis 1 plus cos invisible function application theta comma sin invisible function application theta right parenthesis$ lies between the region corresponding to the acute angle between the lines x-3y=0 and x-6y=0 then

>>> L11 $cross times$ L22 <0
>>> (1+cos $theta$ )² -6sin $theta$ -6sin $theta$ cos $theta$ -3sin $theta$ -3sin $theta$ cos $theta$ +18sin $theta$ ² < 0

If the point $left parenthesis 1 plus cos invisible function application theta comma sin invisible function application theta right parenthesis$ lies between the region corresponding to the acute angle between the lines x-3y=0 and x-6y=0 then

>>> L11 $cross times$ L22 <0
>>> (1+cos $theta$ )² -6sin $theta$ -6sin $theta$ cos $theta$ -3sin $theta$ -3sin $theta$ cos $theta$ +18sin $theta$ ² < 0

If $P open parentheses 1 plus fraction numerator alpha over denominator square root of 2 end fraction comma 2 plus fraction numerator alpha over denominator square root of 2 end fraction close parentheses$ be any point on a line then the range of for which the point ' P ' lies between the parallel lines x+2y=1 and 2x+4y=15 is

((1+ $fraction numerator alpha over denominator square root of 2 end fraction$ )+2( $2 plus fraction numerator alpha over denominator square root of 2 end fraction$ ) -1).( $2 left parenthesis 1 plus fraction numerator alpha over denominator square root of 2 end fraction right parenthesis plus 4 left parenthesis 2 plus fraction numerator alpha over denominator square root of 2 end fraction right parenthesis minus 15$ ) < 0

If $P open parentheses 1 plus fraction numerator alpha over denominator square root of 2 end fraction comma 2 plus fraction numerator alpha over denominator square root of 2 end fraction close parentheses$ be any point on a line then the range of for which the point ' P ' lies between the parallel lines x+2y=1 and 2x+4y=15 is