Question

sum of all integers between 170 and 1000 which are exactly divisible by 8 is?
​

Answer 1

Answer:

All integers between 50 and 500, which are divisible by 7 are

56,63,70,...…,497

which forms an A.P

first term of this A.P is a

1

=56

second term of this A.P is a

2

=63

last term of this A.P is a

n

=497

common difference

d=a

2

−a

1

⟹d=63−56=7 .

nth term of this A.P is given by

a

n

=a

1

+(n−1)d

put a

n

=497;a

1

=56 and d=7 in above equation we get,

⟹497=56+(n−1)7

⟹7n−7+56=497

⟹7n=497−49=448

n=

7

448

=64 number of terms in this A.P

now, sum of these n=64 terms is given by

S

n

=

2

n

(a

1

+a

n

)

put values of n=64;a

1

=56;a

n

=497 we get

S

64

=

2

64

(56+497)

⟹S

64

=

2

64

×553

⟹S

64

=32×553

⟹S

64

=17696

hence the sum of all integers between 50 and 500 which are divisible by 7 , is S

64

=17696

Answer 2

Answer:

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