At point of intersection of the two curves shown, the conc. of B is given by …….. For, $Error converting from MathML to accessible text.$ :

Statement-I : Circumradius and inradius of a triangle can not be 12 and 8 respectively.
Statement-II : Circumradius ≥ 2 (inradius)

The circumradius of a cyclic polygon is a radius of the circle inside which the polygon can be inscribed

inradius is the radius of the circle inscribed inside a polygon.

Statement-I : Circumradius and inradius of a triangle can not be 12 and 8 respectively.
Statement-II : Circumradius ≥ 2 (inradius)

The circumradius of a cyclic polygon is a radius of the circle inside which the polygon can be inscribed

inradius is the radius of the circle inscribed inside a polygon.

Statement-I : For n $element of$ N, 2n > 1 + n $open parentheses square root of open parentheses 2 to the power of n minus 1 end exponent close parentheses end root close parentheses$
Statement-II : G.M. > H.M. and (AM) (HM) = (GM)2

for real and positive numbers, we can use the property AM>=GM
the statement 2 doesn't have any connection with statement 1

Statement-I : For n $element of$ N, 2n > 1 + n $open parentheses square root of open parentheses 2 to the power of n minus 1 end exponent close parentheses end root close parentheses$
Statement-II : G.M. > H.M. and (AM) (HM) = (GM)2

for real and positive numbers, we can use the property AM>=GM
the statement 2 doesn't have any connection with statement 1

Statement-I : 1, 2, 4, 8, ......... is a G.P., 4, 8, 16, 32 is a G.P. and 1 + 4, 2 + 8, 4 + 16, 8 + 32, ....... is also a G.P.
Statement-II : Let general term of a G.P. (with positive terms) with common ratio r be Tk + 1 and general term of another G.P. (with positive terms) with common ratio r be T'k + 1, then the series whose general term T''k + 1 = Tk + 1 + T'k + 1 is also a G.P. with common ratio r.

the mathematical reasoning can be proved by observing the term of the sequences

Statement-I : 1, 2, 4, 8, ......... is a G.P., 4, 8, 16, 32 is a G.P. and 1 + 4, 2 + 8, 4 + 16, 8 + 32, ....... is also a G.P.
Statement-II : Let general term of a G.P. (with positive terms) with common ratio r be Tk + 1 and general term of another G.P. (with positive terms) with common ratio r be T'k + 1, then the series whose general term T''k + 1 = Tk + 1 + T'k + 1 is also a G.P. with common ratio r.

the mathematical reasoning can be proved by observing the term of the sequences

Let p, q, r $element of$ R+ and 27 pqr ≥ (p + q + r)³ and 3p + 4q + 5r = 12 then p³ + q⁴ + r⁵ is equal to -

for real and positive numbers, we can use the property AM>=GM

Let p, q, r $element of$ R+ and 27 pqr ≥ (p + q + r)³ and 3p + 4q + 5r = 12 then p³ + q⁴ + r⁵ is equal to -

for real and positive numbers, we can use the property AM>=GM

For the chemical reaction $3 straight O subscript 2 not stretchy rightwards arrow 2 straight O subscript 3$ , the rate of formation of $straight O subscript 3$ is 0.04 mole lit^-1sec^-1. Determine the rate of disappearance of $straight O subscript 2$

If a homogenous catalytic reaction follows three alternative paths $A comma B$ and $C comma$ then which of the following indicates the relative ease with which the reaction moves?

For the reaction $2 N O left parenthesis g right parenthesis plus H subscript 2 end subscript left parenthesis text end text g right parenthesis ⟶ N subscript 2 end subscript O left parenthesis g right parenthesis plus H subscript 2 end subscript O$ (g), at 900 K. following data are observed.

Find out the rate law and order of reaction -

During the transformation of $blank subscript c end subscript superscript a end superscript X t o subscript d end subscript superscript b end superscript Y comma$ the number of $beta minus p a r t i c l e$ emitted is

For which positive integers n is the ratio, $fraction numerator stretchy sum from k equals 1 to n of k to the power of 2 end exponent over denominator stretchy sum from k equals 1 to n of k end fraction$ an integer?

an A.P is a sequence of mathematical terms which have a common difference with their adjacent elements. the variable n is generalized using an AP as well.

For which positive integers n is the ratio, $fraction numerator stretchy sum from k equals 1 to n of k to the power of 2 end exponent over denominator stretchy sum from k equals 1 to n of k end fraction$ an integer?

an A.P is a sequence of mathematical terms which have a common difference with their adjacent elements. the variable n is generalized using an AP as well.

A particle begins at the origin and moves successively in the following manner as shown, 1 unit to the right, $1 half$ unit up, $1 fourth$ unit to the right, $1 over 8$ unit down, $1 over 16$ unit to the right etc. The length of each move is half the length of the previous move and movement continues in the ‘zigzag’ manner indefinitely. The co-ordinates of the point to which the ‘zigzag’ converges is

the problem states that the particle’s movement follows a geometric progression with the first term being 1 and the ratio being ½ and the particle moves infinitely.
The ratio in the x direction is ¼ . The ratio in the y direction is -1/4

A particle begins at the origin and moves successively in the following manner as shown, 1 unit to the right, $1 half$ unit up, $1 fourth$ unit to the right, $1 over 8$ unit down, $1 over 16$ unit to the right etc. The length of each move is half the length of the previous move and movement continues in the ‘zigzag’ manner indefinitely. The co-ordinates of the point to which the ‘zigzag’ converges is

If a₁, a₂, a₃, ........., an are positive real numbers whose product is a fixed number c, then the minimum value of a₁ + a₂ + a₃ + .... + an – 1 + 2an is

the Am- Gm relation is a handy tool for solving sequence related problems. it is applicable to any sequence of numbers.

If a₁, a₂, a₃, ........., an are positive real numbers whose product is a fixed number c, then the minimum value of a₁ + a₂ + a₃ + .... + an – 1 + 2an is

the Am- Gm relation is a handy tool for solving sequence related problems. it is applicable to any sequence of numbers.

Let $s subscript 1 comma s subscript 2 comma s subscript 3 horizontal ellipsis horizontal ellipsis$ and $t subscript 1 end subscript comma t subscript 2 end subscript comma t subscript 3 end subscript horizontal ellipsis horizontal ellipsis$ are two arithmetic sequences such that $s subscript 1 end subscript equals t subscript 1 end subscript not equal to 0 semicolon s subscript 2 end subscript equals 2 t subscript 2 end subscript$ and $stretchy sum from i equals 1 to 10 of s subscript i end subscript equals stretchy sum from i equals 1 to 15 of t subscript i end subscript$ then the value of $fraction numerator s subscript 2 end subscript minus s subscript 1 end subscript over denominator t subscript 2 end subscript minus t subscript 1 end subscript end fraction$ is

an A.P is a sequence of mathematical terms which have a common difference with their adjacent elements

Let $s subscript 1 comma s subscript 2 comma s subscript 3 horizontal ellipsis horizontal ellipsis$ and $t subscript 1 end subscript comma t subscript 2 end subscript comma t subscript 3 end subscript horizontal ellipsis horizontal ellipsis$ are two arithmetic sequences such that $s subscript 1 end subscript equals t subscript 1 end subscript not equal to 0 semicolon s subscript 2 end subscript equals 2 t subscript 2 end subscript$ and $stretchy sum from i equals 1 to 10 of s subscript i end subscript equals stretchy sum from i equals 1 to 15 of t subscript i end subscript$ then the value of $fraction numerator s subscript 2 end subscript minus s subscript 1 end subscript over denominator t subscript 2 end subscript minus t subscript 1 end subscript end fraction$ is

an A.P is a sequence of mathematical terms which have a common difference with their adjacent elements

If a, b and c are three consecutive positive terms of a G.P. then the graph of y = ax² + bx + c is

Nature of graph of a quadratic equation is given by its discriminant.
Here, a = a, b= ar, c = ar², where r is the common ratio of the GP
Given, a,b,c>0

If a, b and c are three consecutive positive terms of a G.P. then the graph of y = ax² + bx + c is

Nature of graph of a quadratic equation is given by its discriminant.
Here, a = a, b= ar, c = ar², where r is the common ratio of the GP
Given, a,b,c>0

If ln (a + c) , ln (c – a), ln (a – 2b + c) are in A.P., then :

an A.P is a sequence of mathematical terms which have a common difference with their adjacent elements
An = A1+(n-1)x d
A2= A1 + d
A3 = A1 + 2d
A3 = A2+d
A3-A2=A2-A1

If ln (a + c) , ln (c – a), ln (a – 2b + c) are in A.P., then :