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Various classes and different social groups of Indians participated in the Civil Disobedience Movement led by Gandhiji in 1930. All of them joined this movement on account of their own needs, aspirations and limited understanding.

In the rural areas, rich farmers and peasant communities such as Patidars (Gujarat) and Jats in Uttar Pradesh were very hard hit by the trade depression and decreasing costs of their commercial crops. They found themselves unable to pay the government’s revenue due to the disappearance of their cash income. For them the fight was a struggle against high revenue. So, the rich peasants participated in the Civil Disobedience Movement and supported the boycott programmes.

The poorer peasants were not in favour of Iowering of the revenue demand. Many of them were small tenants who used to cultivate rented land taken from landlords. As the depression continued, cash income dwindled and so the tenants were unable to pay their land-rent. They demanded that their dues of rent should be remitted.

The business classes participated in the movement to oppose the colonial polices that restricted business activities. They wanted protection against: imports of foreign goods, and a rupee-sterling foreign exchange ratio that would discourage imports. A few of them attacked colonial control over the Indian Economy and supported the Civil Disobedience Movement. Besides it they supported the movement financially and boycotted the trading of foreign goods.

The industrial working classes stayed away from this movement leaving the Nagpur region as industrialists came closer to the congress. Women took part in this movement. They began to see service to the nation as a sacred duty of women.

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tan^(-1)((1/2+1/5)/(1-1/10))+tan^(-1)(1/8)=tan^(-1)(7/10 / 9/10)+tan^(-1)(1/8)=tan^(-1)(7/9)+tan^(-1)(1/8)=tan^(-1)((7/9+1/8)/(1-7/72))=tan^(-1)(65/65)=tan^(-1)(1)=pie/4

please answer rest of the questions

Zinc : Tin

A 5x : 2x = 7x

B 3y : 4y = 7y

=> A = 7x = 7 kg.

x = 1 kg

∴∴Zinc in Alloy A => 5 kg

Tin in Alloy A => 2 kg.

=> B => 7y = 21 kg.

y = 3 kg.

Zinc in alloy B =>3×3==9kg

Tin in alloy B =>3×4=12kg

∴∴after mix-up the ratio of zinc and tin in new alloy

new ratio is ???

to find the number of valid votes1785436-19209=1766227

The odd integers from 1 to 2001 are 1, 3, 5, …1999, 2001.

This sequence forms an A.P.

Here, first term, a = 1

Common difference, d = 2

Here,

a+(n−1)d = 2001

=> 1+(n−1)(2) = 2001

=> 2n−2 = 2000

=> n = 1001

Sn= n/2[2a+(n−1)d]

∴ Sn= 1001/2[2×1+(1001−1)×2]

=1001/2[2+1000×2]

=1001/2×2002

=1001×1001

=1002001

Hence, the sum of odd numbers from 1 to 2001 is 1002001.

put an end to a state or an activity

tan^(-1)((1/5+1/7)/(1-1/35))+tan^(-1)((1/3+1/8)/(1-1/24))=tan^(-1)(12/34)+tan^(-1)(11/23)=tan^(-1)(6/17)+tan^(-1)(11/23)=tan^(-1)((6/17+11/23)/(1-66/(17*23))=tan^(-1)(((138+187)/(23×17))/(325/(23+17))=tan^(-1)(325/325)=tan^(-1)(1)=pie/4

Thanks teacher your solution is correct....

Total number of votes registered in all=498656+6768+83865=589289

No not parallel as parallel line should have corresponding angle equal considering thay we 98 is not equal 82 .

As x and y are linear pair sox+y = 180and given x-y = 80so we get2x = 260x = 130therefore y is 50

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Bit we have to show that tan threta =13

n(E)=(n-2)!*2!n(s)=(n-1)! as circular arrngmntnwP(E)=(n-2)!*2!/(n-1)!=2/(n-1)P(E)'=(1-(2/n-1))=(n-3)/(n-1)now ATQodd against:P(E)'/P(E)=(n-3)/2=(n-3)/2put n =15hence15-3/2=12/2=6 chances

(1024×1024×1024×81×81×81×81)/(243×243×128×128×128×128) = (4×4×4×81×81)/(3×3) = 4×4×4×9×81 = 46656

thank u very much

i) both triangle are congurent by SAS rule

At x = 8 it cuts x axis

At y = 4 it cuts y axis

Consider the LHS:(1-sinA+cosA)^2= [(1-sinA) + cosA]^2= (1-sinA)^2+ cos^2A+ 2(1-sinA)cosA= 1 + sin^2A− 2sinA+ cos^2A+ 2(1-sinA)cosA= 1 + (sin^2A+ cos^2A)− 2sinA+ 2(1-sinA)cosA= 1 + 1− 2sinA+ 2(1-sinA)cosA [Since,sin^2A+ cos^2A =1]= 2− 2sinA+ 2(1-sinA)cosA= 2(1− sinA) + 2(1-sinA)cosA= 2(1− sinA)(1 +cosA)= RHS

SORRY I COULD NOT ANSWER THIS QUESTION NEXT TIME I WILL SURELY ANSWERING YOU

Answer: let Mohan's present age be x

Then Ram's age = 2x+3

According to the question:

x+2x+3=27

3x=27-3

3x=24

x=24/3

x=6

Therefore ,

Ram's age=x=6 years

Mohan's age= 2x+3 = 2(6)+3 = 15 years

Where is the figure?

thanks

correct is answer is the =2

2 is the right answer

2 is the right answer

L.H.S1+tan^2A/1+cot^2A=(1+sin^2A/cos2A)/(1+cos^2A/sin^2A)=((cos^2A+sin^2A)/cos^2A)/(sin^2A+cos^2A)/sin^2A=(1/cos^2A)/(1/sin^2A)=1/cos^2A*sin^2A/1=sin^2A/cos^2A=tan^2A

M.H.S(1-tanA/1-cotA)^2=(1+tan^2A-2tanA)/(1+cot^2-2cotA)=(sec^2A-2tanA)/(cosec^2A-2cosA/sinA)=(sec^2A-2*sinA/cos A)/(cosec^2A-2cosA/sinA)=(1/cos^2A-2sinA/cosA)/(1/sin^2A-2cosA/sinA)=[(1-2sinAcosA)/cos^2A]/[(1-2cosAsinA)sin^2A]=(1-2sinAcosA)/cos^2A*sin^2A/(1-2sinAcosA)=sin^2A/cos^2A=tan^2A

R.H.S=tan^2A

Hence L.H.S=M.H.S = R.H.S

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Given is graph of x + 2y = 8

x - axis cut at 8

y - axis cut at 4

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LHS = (a-b)² = (2-6)² = -4² = 16

RHS = a²-2ab+b² = 2²-2(2)(6)+6²

= 4-24+36 = 16since LHS = RHSverified.

that is not ( a-b)^2.that is (a+b)^2

a,b,c,dare in G.P.

Therefore,

bc=ad… (1)

b2=ac… (2)

c2=bd… (3)

It has to be proved that,

(a²+b²+c²) (b²+c²+d²) = (ab+bc–cd)²

R.H.S.

= (ab+bc+cd)²

= (ab+ad+cd)²[Using (1)]

= [ab+d(a+c)]²

=a²b²+ 2abd(a+c) +d²(a+c)²

=a²b²+2a²bd+ 2acbd+d²(a²+ 2ac+c2)

=a²b²+ 2a²c²+ 2b²c²+d²a²+ 2d²b²+d²c²[Using (1) and (2)]

=a²b²+a²c²+a²c²+b²c²+b²c²+d²a²+d²b²+d²b²+d²c²

=a²b²+a²c²+a²d²+b2×b2+b²c²+b²d²+c²b²+c²×c²+c²d²

[Using (2) and (3) and rearranging terms]

=a²(b²+c²+d²) +b²(b²+c²+d²) +c²(b²+c²+d²)

= (a²+b²+c²) (b²+c²+d²)

= L.H.S.

∴ L.H.S. = R.H.S.

Axiomsandpostulatesare the basicassumptionsunderlying a given body of deductive knowledge. They are accepted without demonstration. All other assertions (theorems, if we are talking about mathematics) must be proven with the aid of these basicassumptions.

Ans :- 1. Requires relatively small space for growing.2. Pathogen free plants can be raised and maintained economically.3.Small size of propagules and their ability to proliferate in the soil free environment facilitate their storage on a large scale.4. Stocks of germplasm can be stored and maintained for many years.

Micropropagation has a number of advantages over traditional plant propagation techniques:

The main advantage of micropropagation is the production of many plants that are clones of each other.

Micropropagation can be used to produce disease-free plants.

It can have an extraordinarily highfecundityrate, producing thousands ofpropaguleswhile conventional techniques might only produce a fraction of this number.

It is the only viable method of regeneratinggenetically modifiedcells or cells afterprotoplastfusion.

Thanxx..

Solution:Number of Seats in a bus = 50Number of children for picnic = 400Number of buses = ?

Number of buses = 400/50Number of buses = 40/5Number of

Number of Buses = 400/50 = 40/5 = 8

So,Number of buses = 8

8 is the correct answer.

number of childrens = 400number of seats = 50number of buses = ?

according to question no. of buses = 400/50 no. of buses = 8

400/50=8 8 buses are required to take 400 children for picnic.

In geometry, the circumference of a circle is the distance around it. That is, the circumference would be the length of the circle if it were opened up and straightened out to a line segment. Since a circle is the edge of a disk, circumference is a special case of perimeter.

thnxs

what is formula of circumference of circle?

Thecircumference formulais used to calculate the distance around a circle.Circumferenceformulas: C = 2πr or C = πd. r is the radius and d is the diameter.

Let positive integer a be the any positive integer.

Then, b = 4 .

By division algorithm we know here

0 ≤ r < 4 , So r = 0, 1, 2, 3.

When r = 0

a = 4m

Squaring both side , we get

a² = ( 4m )²

a² = 4 ( 4m​²)

a² = 4q , where q = 4m²

When r = 1

a = 4m + 1

squaring both side , we get

a² = ( 4m + 1)²

a² = 16m² + 1 + 8m

a² = 4 ( 4m² + 2m ) + 1

a² = 4q + 1 , where q = 4m² + 2m

When r = 2

a = 4m + 2

Squaring both hand side , we get

a² = ​( 4m + 2 )²

a² = 16m² + 4 + 16m

a² = 4 ( 4m² + 4m + 1 )

a² = 4q , Where q = ​ 4m² + 4m + 1

When r = 3

a = 4m + 3

Squaring both hand side , we get

a² = ​( 4m + 3)²

a² = 16m² + 9 + 24m

a² = 16m² + 24m ​ + 8 + 1

a² = 4 ( 4m² + 6m + 2) + 1

a² = 4q + 1 , where q = 4m² + 6m + 2

Hence ,Square of any positive integer is in form of 4q or 4q + 1 , where q is any integer.