Math, asked by shikhaacharjee805, 1 month ago

64 g of methanol is dissolved in 126 g of water the mole fraction of methanol in the solution is?​

Answers

Answered by Debrajgamer2
1

Answer:

64 g of methanol is dissolved in 126 g of water the mole fraction of methanol in the solution is

Step-by-step explanation:

Correct option is

B

0.22,0.78

Given conditions ⇒

Mass of the Methanol = 60 g.

Molar mass of the Methanol = 32 g/mole.

∵ No. of moles of Methanol =

Molar Mass

Mass

∴ No. of moles = 60/32

= 1.875 mole.

Mass of the Water = 120 g.

Molar mass of the water = 18 g/mole.

∴ No. of moles of Water =

Molar mass

Mass

.

= 120/18

= 6.67 mole.

Now, Total number of moles in a solution = No. of moles of Methanol + No. of moles of water.

= 1.875 + 6.67

= 8.545 moles.

Now,

Mole Fraction of Methanol in the solution =

Total number of moles in a solutions

No. of moles of Methanol

.

= 1.875/8.545

= 0.22

Mole Fraction of Water in the solution =

Total number of moles in a solution

No. of moles of water

.

= 6.67/8.545

= 0.78

Answered by debrajgamer55
2

Common difference of AP is 4.

(b) First term of AP is 5.

Explanation:

Given information,

Fifth term of an arithmetic sequence is 21 and it's ninth term is 37.

(a) what is it's common difference?

(b) What is it's first term?

Here,

\sf a_{5}a

5

= 21

\sf a_{9}a

9

= 37

a = ?

d = ?

⚘ Using formula of nth term ::

\bf{\dag}\:{\boxed{\tt{a_{n} = a + (n - 1)d}}}†

a

n

=a+(n−1)d

⠀⠀⠀━━━━━━━━━━━━━━━━━━━━━━

(a)

➨ \tt a_{5} = a + (5 - 1)da

5

=a+(5−1)d

➨ \tt 21 = a + 4d21=a+4d

➨ \tt a = 21 - 4d\qquad- (1)a=21−4d−(1)

Also,

➨ \tt a_{9} = a + (9 - 1)da

9

=a+(9−1)d

➨ \tt 37 = a + 8d37=a+8d

➨ \tt a = 37 - 8d\qquad- (2)a=37−8d−(2)

From (1) & (2) we get,

➨ \tt 21 - 4d = 37 - 8d21−4d=37−8d

➨ \tt 21 - 37 = - 8d + 4d21−37=−8d+4d

➨ \tt \cancel{-} 16 = \cancel{-} 4d

16=

4d

➨ \tt 4d = 164d=16

➨ \tt d = {\cancel{\dfrac{16}{4}}}d=

4

16

➨ d = 4

Hence, common difference (d) of AP is 4.

(b)

Put d = 4 in (1) we get,

➨ \tt a = 21 - (4\:\times\:4)a=21−(4×4)

➨ \tt a = 21 - 16a=21−16

➨ a = 5

Hence, first term (a) of AP is 5.

Verification:

➨ \tt a_{5} = a + (5 - 1)da

5

=a+(5−1)d

➨ \tt 21 = a + 4d21=a+4d

By putting value of a and d in above equation we get,

➨ \tt 21 = 5 + (4\:\times\:4)21=5+(4×4)

➨ \tt 21 = 5 + 1621=5+16

➨ \tt 21 = 2121=21

➨ LHS = RHS

Also,

➨ \tt a_{9} = a + (9 - 1)da

9

=a+(9−1)d

➨ \tt 37 = a + 8d37=a+8d

By putting value of a and d in above equation we get,

➨ \tt 37 = 5 + (8\:\times\:4)37=5+(8×4)

➨ \tt 37 = 5 + 3237=5+32

➨ \tt 37 = 3737=37

➨ LHS = RHS

Hence, Verified ✔

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