Tổng số hạt trong 2 nguyên tử kim loại A và B là 94. Trong đó tổng số hạt mang điện nhiều hơn tổng số hạt không mang điện là 30. Số hạt mang điện của nguyên tử A ít hơn số hạt mang điện của nguyên tử B là 14. Xác định 2 nguyên tử kim loại A và B
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2pM + nM + 2pX + nX = 94
2pM + 2pX - nM - nX = 30
2pX - 2pM = 18
=> \(\left\{{}\begin{matrix}p_M=11\\p_X=20\end{matrix}\right.\)
=> M, X lần lượt là Na, Ca
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Ta có :
$2p_A + n_A + 2p_B + n_B = 177$
$(2p_A + 2p_B) - (n_A + n_B) = 47$
Suy ra: $2p_A + 2p_B = 112(1)$
Mà: $2p_B - 2p_A = 8(2)$
Từ (1)(2) suy ra $p_A = 26 ; p_B = 30$
bạn có thể giải thích ở chỗ tại sao ra 2pA+2pB=112 được không
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Ta có :
\(\left\{{}\begin{matrix}2\left(pA+pB\right)+\left(nA+nB\right)=142\\2\left(pA+pB\right)-\left(nA+nB\right)=42\end{matrix}\right.\)
=>\(\left\{{}\begin{matrix}pA+pB=46\\pA+pB=50\end{matrix}\right.\)
Hạt mang điện của B nhiều hơn A:
2(pB−pA)=12⇒pB−pA=6
Từ 3 phương trình trên
=>pA=20 (Ca)
=>pB=26 (Fe)
![](https://rs.olm.vn/images/avt/0.png?1311)
Giải:
p1 + n1 + e1 + p2 + n2 + e2 = 142
Mà ( p = e )
<=> 2p1 + 2p2 + n1 + n2 = 142 (1)
Mặt khác:
2p1 + 2p2 - n1 + n2 = 142
Cộng (1) và (2)
=> 4p1 + 4p2 = 184 (3)
Mà: 2p2 - 2p1 = 12
<=> -2p1 + 2p2 = 12 (4)
Giải (3) và (4):
p1 = 20 ( Ca )
p2 = 26 ( Fe )
ĐÁNH GIÁ CHO MÌNH NHÉ
![](https://rs.olm.vn/images/avt/0.png?1311)
Gọi tổng số hạt proton , electron , notron của 2 nguyên tử X và Y là M
gọi số proton , electron , notron của M lần lượt là p ,e ,n . TA CÓ :
p+e+n = 76 => 2p + n = 76 ( vì nguyên tử trung hòa về điện) (1)
do tổng số hạt mang điện tích lớn hơn tổng số hạt không mang điện tích là 24 hạt
=> 2p - n = 24
Kết hợp (1) ta được 2p = 50 => tổng số hạt mang điện tích của 2 nguyên tử X và Y là 50 hạt (*)
Từ đề ra ta lại có :
số hạt mang điện(Y) - số hạt mang điện(X) = 18(**)
Từ (*) và (**) => số hạt mang điện của Y = 34 (hạt) => Y có 17 proton => Y là nguyên tố Clo
=> số hạt mang điện của X = 16 (hạt) => X có 8 proton => X là nguyên tố Oxi
\(TC:\)
\(2p_A+n_A+2p_B+n_B=94\)
\(\Leftrightarrow2\left(p_A+p_B\right)+\left(n_A+n_B\right)=94\left(1\right)\)
\(2\left(p_A+p_B\right)-\left(n_A+n_B\right)=30\left(2\right)\)
\(\left(1\right),\left(2\right):\)
\(p_A+p_B=31\left(3\right)\)
\(n_A+n_B=32\)
\(2p_B-2p_A=14\left(4\right)\)
\(\left(3\right),\left(4\right):\)
\(p_A=12\)
\(p_B=19\)
\(A:Mg\)
\(B:K\)
giải kĩ hơn chỗ ni giùm mk với đc k![](data:image/png;base64,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)