a) tự làm

b) (57-17)+(58-18)+(59-19)+(60-20)+(61-21)=40+40+40+40+40=200

c) (9+15)+(11+13)+(-10-14)+(-12-12-4)=24+24-24-24-4=-4

d)-(1+2+3+.....+2007)=\(-\dfrac{\left(1+2007\right).2007}{2}=-2015028\)

a) (371-271)+(731-531)=100+200=300

b) (57-17)+(58-18)+(59-19)+(60-20)+(61-21)=40+40+40+40+40=200

c) (9+15)+(11+13)+(-10-14)+(-12-12-4)=24+24-24-24-4=-4

d)-(1+2+3+.....+2007)=

A= 1-2+3-4+...+59-60

  =(1-2)+(3-4)+...+(59-60)

  =-1+(-1)+...+(-1) 

  =(-1)*30

  = -30

Đáp án : -30

( 1- 2 ) + ( 3 - 4 ) + ....+( 59 - 60 )

= ( -1 ) + ( -1 ) + .....+ ( -1 )

= Từ 1 đến 60 có 60 số. Vậy có 30 tổng ( số hạng ).

=> Nên tổng trên có kết quả là : ( -1 ) * 30

= -30

Vậy đáp án là -30. 

a)=407.52.34

=21164.34

=719576

b)=197.(52+23+59)

=197.134

=26398

\(a,\left(4^{19}+3^{21}\right).\left(5^{20}-3^{15}\right).\left(2^6-8^2\right)\\ =\left(4^{19}+3^{21}\right).\left(5^{20}-3^{15}\right).\left(2^{3.2}-2^{3.2}\right)\\ =\left(4^{19}+3^{21}\right).\left(5^{20}-3^{15}\right).0=0\)

\(b,2^5.197+197.3^2+197.59\\ =197.32+197.9+197.59\\ =197.\left(32+9+59\right)\\ =197.100=19700\)

̉̉d

Cho S = 1/21 + 1/22 + 1/23 +... + 1/60

S₁=1/21 + 1/22 +..+ 1/40 (20 số hạng); S₂= 1/41 + 1/42 +... + 1/60 (20 số hạng)

* Ta thấy: S₁ > 1/40 x 20 = 1/2 (vì 1/40 = 1/40, 19 số hạng kia đều lớn hơn 1/40); S₂ > 1/60 x 20 = 1/3

\(\Rightarrow\)S > 1/2 + 1/3 = 5/6 = 25/30 > 22/30 = 11/15

Vậy 1/21 + 1/22 + ... + 1/60 > 11/15

* Ta thấy: S₁ < 1/21 x 20 = 20/21(vì 1/20 = 1/20, 19 số hạng còn lại đều bé hơn 1/21); S₂ < 1/41 x 20 = 20/41

\(\Rightarrow\)S < 20/21 + 20/41 = 1240/861 < 3/2 (đoạn này thì bạn phải dùng máy tính chứ mik ko bt tính nhanh kiểu j)

Ta có đpcm

A=4¹+4²+4³+4⁴+...+4⁵⁹+4⁶⁰

=(4¹+4²)+(4³+4⁴)+...+(4⁵⁹+4⁶⁰)

=4¹(1+4)+4³(1+4)+...+4⁵⁹(1+4)

=4¹*5+4³*5+...+4⁵⁹*5

=5(4¹+4³+...+4⁵⁹) chia hết 5

A=4¹+4²+4³+4⁴+...+4⁵⁹+4⁶⁰

=(4¹+4²+4³)+...+(4⁵⁸+4⁵⁹+4⁶⁰)

=4¹(1+4+4²)+...+4⁵⁸(1+4+4²)

=4¹*21+...+4⁵⁸*21

=21*(4¹+...+4⁵⁸) chia hết 21

b,A= \(\dfrac{11}{15}<\dfrac{1}{21}+\dfrac{1}{22}+\dfrac{1}{23}+...+\dfrac{1}{59}+\dfrac{1}{60}<\dfrac{3}{2}\)

\(=(\dfrac{1}{21}+\dfrac{1}{22}+\dfrac{1}{23}+....+\dfrac{1}{40})+(\dfrac{1}{41}+...+1...\)
\(=(\dfrac{20}{20.21}+\dfrac{21}{21.22}+...+\dfrac{39}{39.40})+(40/...\)
\(20(\dfrac{1}{20.21}+\dfrac{1}{21.22}+...\dfrac{1}{39.40})+40(\dfrac{1}{40}...\)
\(20(\dfrac{1}{20}-\dfrac{1}{40})+40(\dfrac{1}{40}-\dfrac{1}{60})>\dfrac{11}{15}\)
Lại có \(A<40(\dfrac{1}{20.21}+...\dfrac{1}{39.40})+60(\dfrac{1}{40.41}+...+...\)
\(=40(\dfrac{1}{20}-\dfrac{1}{40})+60(\dfrac{1}{40}-\dfrac{1}{60})<\dfrac{3}{2}\)

=> \(\dfrac{11}{15}<\dfrac{1}{21}+\dfrac{1}{22}+\dfrac{1}{23}+...+\dfrac{1}{59}+\dfrac{1}{60}<\dfrac{3}{2}\)

a,\( \dfrac{1}{4}+ \dfrac{1}{16}+ \dfrac{1}{36}+ \dfrac{1}{64}+ \dfrac{1}{100}+ \dfrac{1}{144}+ \dfrac{1}{196}\)

= \( \dfrac{1}{4}+ \dfrac{1}{16}+ \dfrac{1}{36}+...+ \dfrac{1}{196} < \dfrac{1}{2^2-1}+ \dfrac{1}{4^2-1}+ \dfrac{1}{6^2-1}+...+ \dfrac{1}{14^2-1}\)

= \( \dfrac{1}{1.3}+ \dfrac{1}{3.5}+ \dfrac{1}{5.7}+...+ \dfrac{1}{13.15}\)

= \( \dfrac{1}{2}(1- \dfrac{1}{3}+ \dfrac{1}{3}- \dfrac{1}{5}+ \dfrac{1}{5}- \dfrac{1}{7}+ \dfrac{1}{7}-...- \dfrac{1}{13}+ \dfrac{1}{13}- \dfrac{1}{15})\)

= \( \dfrac{1}{2}(1- \dfrac{1}{15})< \dfrac{1}{2}\)

Vậy \( \dfrac{1}{4}+ \dfrac{1}{16}+ \dfrac{1}{36}+ \dfrac{1}{64}+ \dfrac{1}{100}+ \dfrac{1}{144}+ \dfrac{1}{196}\) \(<\dfrac{1}{2} \)