Lời giải:

a. $A=\left\{x| x=4k+3, k\in\mathbb{N}, 6\geq k\geq 1\right\}$

b. $B=\left\{x| x=k^2, k\in\mathbb{N}, 2\leq k\leq 7\right\}$

c. Bạn xem lại đề xem đã viết đúng chưa nhỉ?

d. $D=\left\{x| x=2k+1, k\in\mathbb{N}, 6\leq k\leq 14\right\}$

Trả lời :

D = { k² | k ∈ N | 1 < k < 8 }

~~Học tốt~~

??????

a) \(A=\left\{2k+1|k\inℕ;6\le k\le14\right\}\)

b) \(B=\left\{2l|l\inℕ;11\le l\le21\right\}\)

c) \(C=\left\{4m+3|m\inℕ;1\le m\le6\right\}\)

d) \(D=\left\{n^2|n\inℕ;2\le n\le7\right\}\)

a) \(A=\left\{13;15;17;...29\right\}\)

\(\Rightarrow A=\left\{x|x\inℕ;x=2k+1;7\le k\le14;k\inℕ\right\}\)

b) \(B=\left\{22;24;26;...;42\right\}\)

\(\Rightarrow B=\left\{x|x\inℕ;x=2k;11\le k\le21;k\inℕ\right\}\)

c) \(C=\left\{7;11;15;19;23;27\right\}\)

\(\Rightarrow A=\left\{x|x\inℕ;x=4k+3;1\le k\le6;k\inℕ\right\}\)

d) \(D=\left\{4;9;16;25;36;49\right\}\)

\(\Rightarrow A=\left\{x|x\inℕ;x=k^2;2\le k\le7;k\inℕ\right\}\)

A = {\(x\) = 2k + 1/ k\(\in\) N; 6≤ k ≤ 14}

B = {\(x\)  = 2k/ k \(\in\) N; 11 ≤ k ≤ 21}

D = {\(x\) = k²/ k \(\in\) N; 2 ≤ k ≤ 7}

C = {\(x\) = 4k + 7/k \(\in\) N; 0 ≤ k ≤ 5}

d' d d''

Vẽ dễ mà 

a, -( -a + c - d) - ( c - d + d) =  a - c + d - c + d - d =  a + d

b, - ( a+b-c+d) + (a-b-c-d) = -a -b+c-d + a-b-c-d = -2b + (-2c)= -2(b+c)

a) - ( - a + c – d ) – ( c – a + d ) 

= a - c - d - c + a + d

= (a + a) + (-c - c) + (-d + d)

= 2a - 2c               

b) – ( a + b  - c + d ) + ( a – b – c –d )

= - a - b + c - d + a - b - c - d

= (-a + a) + (-b - b) + (c - c) + (-d - d)

= -2b - 2d

a) - ( - a + c - d) - ( c - a + d )

= a - c + d - c + a - d 

= 2a

b) - ( a+ b - c + d ) + ( a -b -c -d )

= - a-b+c-d+a-b-c-d

=-2d -2b

c) a(b-c-d) - a(b+c-d)

= a(b-c-d-b-c+d)

= ab-ac-ad-ab-ac+ad

= -2ab-2ac

d) (a+b)(c+d)-(a+d)(b+c)

= ac+ad+bc+bd - (ab+ac+bd+cd)

= ac+ad+bc+bd-ab-ac-bd-cd

=ad+bc-ab-cd

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