Egyenletek grafikus megoldása – #2

(lineáris → abszolútérték, másodfokú, négyzetgyök)

1.	|x – 1| – 2 = 1		M1(4; 1)M2(–2; 1)
2.	|x + 5| – 4 = 0,5x + 1,5		M1(–7; –2)M2(1; 2)
3.	|x |– 3 = 0,5x + 1,5		M1(–3; 0)M2(9; 6)
4.	–|x – 2| + 5 = x/3 – 1		M1(–6; –3)M2(6; 1)
5.	–|x + 1| + 6 = 5x/7 + 5		M1(–7; 0)M2(0; 5)
6.	|x – 1| – 4 = x/3 – 1		M1(–1,5; –1,5)M2(6; 1)
7.	|x + 1| – 4 = –x/3 + 1		M1(–9; 4)M2(3; 0)
8.	|x + 6| + 2 = –x/2 + 2		M1(–4; 4)M2(–12; 8)
9.	|x – 1| – 5 = x + 2		M1(–3; –1)(Egy közös pont van!!!)
10.	|x – 1| – 1 = x/2 + 1		M1(–2/3; –2/3)M2(6; 4)
11.	|x + 3| – 2 = x/2 + 1		M1(–4; –1)M2(0; 1)
12.	–|x| + 4 = x/2 + 1		M1(–6; –2)M2(2; 2)
13.	–|x| + 6 = x + 2		M1(2; 4)(Egy közös pont van!!!)
14.	x + 2 = x2		M1(–1; 1)M2(2, 4)
15.	(x – 4)2 – 3 = –2		M1(3; –2)M2(5; –2)
16.	x2 – 3 = –x – 3		M1(0; –3)M2(–1; –2)
17.	(x + 4)2 – 4 = x + 2		M1(–5; –3)M2(–2; 0)
18.	– x/2 – 3 = (x – 1)2 – 11		M1(–2; –2)M2(3,5; –4,75)
19.	–x2 + 3 = –x/2 – 2		M1(–2; –1)M2(2,5; –3,25)
20.	– (x + 2)2 + 8 = x + 4		M1(–5; –1)M2(0; 4)
21.	(x + 3)2 – 6 = –2x – 9		M1(–6; 3)M2(–2; –5)
22.	– (x – 1)2 + 4 = x – 3		M1(–2; –5)M2(3; 0)
23.	(x – 2)2 – 10 = –x – 2		M1(–1; –1)M2(4; –6)
24.	(x – 1)2 – 6 = –2x – 1		M1(–2; 3)M2(2; –5)
25.	(x + 1)2 – 2 = 2x + 3		M1(–2; –1)M2(2; 7)
26.	|x| – 3 = x/3 + 1		M1(–3; 0)M2(6; 3)
27.	x2 – 3 = –x – 3		M1(–3; 6)M2(2; 1)
28.	(x – 2)2 – 7 = 2x – 3		M1(0; –3)M2(6; 9)
29.	(x – 2)2 – 7 = 3x – 9		M1(1; –6)M2(6; 9)
30.	|x – 2| – 7 = x/3 – 5		M1(0; –5)M2(6; –3)
31.	|x + 3| – 6 = 3x/5 – 1		M1(–5; –4)M2(5; 2)
32.	–|x + 3| + 6 = x + 3		M1(0; 3)(Egy közös pont van!!!)
33.	sqrt(x + 2) – 3 = –x – 3		M(–1; –2)(Egy közös pont van!!!)
34.	sqrt(x – 3) + 1 = –x/4 + 3		M(4; 2)(Egy közös pont van!!!)
35.	sqrt(x + 3) – 1 = x/3		M1(–3; –1)M2(6; 2)
36.	-sqrt(x + 3) + 2 = –x – 1		M1(–3; 2)M2(–2; 1)
37.	-sqrt(x + 5) = –x/4 – 2		M1(–4; –1)M2(4; –3)
38.	sqrt(x + 4) + 1 = x/3 + 3		M1(–3; 2)M2(0; 3)
39.	sqrt(x – 2) + 1 = x/3 + 1		M1(3; 2)M2(6; 3)
40.	sqrt(x – 1) + 2 = x/4 + 1,75		M1(1; 2)M2(17; 6)