Question

Describe the flight of the pilot and the hurdles he had encountered?

CHP:- 3
PART:-II The Black Aeroplane


CLASS:- 10​

Answer 1

Answer:

$\huge\fbox\red{A}\fbox\green{n}\fbox\orange{S}\fbox\blue{w}\fbox\pink{E}\fbox\purple{r}$

When the pilot is flying towards his home in Dakota, suddenly he is surrounded by a storm. As his plane moved inside the dark clouds, his compass stopped working and he was not able to see anything. Even his radio was not working and he was not able to contact ground control.

⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅

$\bold \star\red{\underline{\boxed{Hope \: it \: helps \: you}}}\star$

$\bold \star\orange{\underline{\boxed{Pls \: follow \: kar \: do}}}\star$

$\bold \star\green{\underline{\boxed{Pls \: mark \: me \: brainlist }}}\star$

⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅⑅

Answer 2

Answer:

Answer:

Value of x in the given equation is 7.

Step-by-step explanation:

\bf{Q)}\;\sf{\dfrac{x-3}{x+1}=\dfrac{1}{2}}Q)

x+1

x−3

=

2

1

To Find:

Value of x.

Solution:

According to the question,

\sf{\implies\dfrac{x-3}{x+1}=\dfrac{1}{2}}⟹

x+1

x−3

=

2

1

By cross-multiplication,

\sf{\implies2(x-3)=1(x+1)}⟹2(x−3)=1(x+1)

Opening the brackets,

\sf{\implies2x-6=x+1}⟹2x−6=x+1

Transposing variables to LHS, constants to RHS and changing its sign,

\sf{\implies2x-x=1+6}⟹2x−x=1+6

Solving further,

\bf{\implies x=7}⟹x=7

Hence,

x = 7

Verification:

We will substitute the value of x to the equation and see if LHS = RHS or not. If LHS = RHS, then our value for x is correct.

LHS:

\sf{\longmapsto\dfrac{7-3}{7+1}}⟼

7+1

7−3

\sf{\longmapsto\dfrac{4}{8}}⟼

8

4

\sf{\longmapsto\dfrac{4\div4}{8\div4}}⟼

8÷4

4÷4

\sf{\longmapsto\dfrac{1}{2}}⟼

2

1

RHS:

\sf{\longmapsto\dfrac{1}{2}}⟼

2

1

As,

LHS = RHS.

Hence, Verified