The second equation directly gives (p-q=2). The intersection point satisfies both equations, so full solving is not always necessary.
Step 2
Why this answer is correct
The correct answer is A. (2). The second equation directly gives (p-q=2). The intersection point satisfies both equations, so full solving is not always necessary.
Step 3
Exam Tip
दूसरे समीकरण से सीधे (p-q=2) मिलता है। प्रतिच्छेद बिंदु दोनों समीकरणों को संतुष्ट करता है, इसलिए पूरा हल निकालना जरूरी नहीं।
From the first equation, (s=10-2r). Substitution gives \(r=\frac{17}{5}\) and \(s=\frac{16}{5}\), so \(r+s=\frac{33}{5}\); none of the options match, so option verification is essential.
Step 2
Why this answer is correct
The correct answer is C. (7). From the first equation, (s=10-2r). Substitution gives \(r=\frac{17}{5}\) and \(s=\frac{16}{5}\), so \(r+s=\frac{33}{5}\); none of the options match, so option verification is essential.
Step 3
Exam Tip
पहले से (s=10-2r), रखने पर (r-2(10-2r)=-3), इसलिए \(r=\frac{17}{5}\) और \(s=\frac{16}{5}\)। अतः \(r+s=\frac{33}{5}\), इसलिए दिए विकल्पों में कोई सही नहीं; ऐसे प्रश्न में विकल्प-सत्यापन जरूरी है।
Substituting ((-3,2)) makes (x+y=-1) and (2x-y=-8) true. Substituting the intersection point in both equations is the fastest check.
Step 2
Why this answer is correct
The correct answer is A. (x+y=-1), (2x-y=-8). Substituting ((-3,2)) makes (x+y=-1) and (2x-y=-8) true. Substituting the intersection point in both equations is the fastest check.
Step 3
Exam Tip
((-3,2)) रखने पर (x+y=-1) और (2x-y=-8) दोनों सही हैं। प्रतिच्छेद बिंदु को दोनों समीकरणों में रखना सबसे तेज जांच है।
From the first equation, (y=19-4x). Substituting gives (x-2(19-4x)=-7), so (x=3), (y=7). This is the graph intersection.
Step 2
Why this answer is correct
The correct answer is A. ((3,7)). From the first equation, (y=19-4x). Substituting gives (x-2(19-4x)=-7), so (x=3), (y=7). This is the graph intersection.
Step 3
Exam Tip
पहले से (y=19-4x), दूसरे में रखने पर (x-2(19-4x)=-7), इसलिए (x=3), (y=7)। यही ग्राफ का प्रतिच्छेद है।
The equations are (x+y=42) and (x-y=8), giving (x=25), (y=17). In word problems, first define the variables clearly.
Step 2
Why this answer is correct
The correct answer is A. ((25,17)). The equations are (x+y=42) and (x-y=8), giving (x=25), (y=17). In word problems, first define the variables clearly.
Step 3
Exam Tip
समीकरण (x+y=42) और (x-y=8) हैं, जिनसे (x=25), (y=17)। शब्द-प्रश्न में पहले चर स्पष्ट तय करें।
From the second equation, (5x=7+2y), and solving gives (x=3), (y=4). Hence the (y)-coordinate of the intersection is (4).
Step 2
Why this answer is correct
The correct answer is C. (4). From the second equation, (5x=7+2y), and solving gives (x=3), (y=4). Hence the (y)-coordinate of the intersection is (4).
Step 3
Exam Tip
दूसरे से (5x=7+2y) और हल करने पर (x=3), (y=4)। इसलिए प्रतिच्छेद का (y)-निर्देशांक (4) है।
From the first equation, (y=2x-6). Substituting gives (x+4x-12=8), so (x=4) and (y=2). The intersection point is the graphical solution.
Step 2
Why this answer is correct
The correct answer is A. ((4,2)). From the first equation, (y=2x-6). Substituting gives (x+4x-12=8), so (x=4) and (y=2). The intersection point is the graphical solution.
Step 3
Exam Tip
पहले से (y=2x-6), दूसरे में रखने पर (x+4x-12=8), इसलिए (x=4) और (y=2)। प्रतिच्छेद बिंदु ही ग्राफीय हल है।
Substituting (\left\(\frac{7}{2},-\frac{1}{2}\right\)) makes (x-y=4) and \(2x+y=\frac{13}{2}\) true. Check the point in both equations.
Step 2
Why this answer is correct
The correct answer is A. (x-y=4), \(2x+y=\frac{13}{2}\). Substituting (\left\(\frac{7}{2},-\frac{1}{2}\right\)) makes (x-y=4) and \(2x+y=\frac{13}{2}\) true. Check the point in both equations.
Step 3
Exam Tip
(\left\(\frac{7}{2},-\frac{1}{2}\right\)) रखने पर (x-y=4) और \(2x+y=\frac{13}{2}\) सत्य हैं। विकल्पों में बिंदु को दोनों समीकरणों में जांचें।
From (2x+y=13), (y=13-2x); substituting gives (10x=50), so ((5,3)). A graphical solution always satisfies both equations.
Step 2
Why this answer is correct
The correct answer is A. ((5,3)). From (2x+y=13), (y=13-2x); substituting gives (10x=50), so ((5,3)). A graphical solution always satisfies both equations.
Step 3
Exam Tip
(2x+y=13) से (y=13-2x), रखने पर (10x=50), इसलिए ((5,3))। ग्राफीय समाधान हमेशा दोनों समीकरणों को संतुष्ट करता है।
The equations are (x+y=100) and (y-x=20), giving (x=40), (y=60). In word problems, first form the two correct linear equations.
Step 2
Why this answer is correct
The correct answer is A. ((40,60)). The equations are (x+y=100) and (y-x=20), giving (x=40), (y=60). In word problems, first form the two correct linear equations.
Step 3
Exam Tip
समीकरण (x+y=100) और (y-x=20) हैं, जिनसे (x=40), (y=60)। शब्द-प्रश्न में पहले दो सही रेखीय समीकरण बनाएं।
From the second equation, (y=5-x). Substituting gives (2x-(5-x)=4), so (x=3) and (y=2). The graphical intersection is this solution.
Step 2
Why this answer is correct
The correct answer is B. ((3,2)). From the second equation, (y=5-x). Substituting gives (2x-(5-x)=4), so (x=3) and (y=2). The graphical intersection is this solution.
Step 3
Exam Tip
दूसरे से (y=5-x), इसे पहले में रखने पर (2x-(5-x)=4), इसलिए (x=3) और (y=2)। ग्राफ का प्रतिच्छेद यही समाधान है।
((0,0)) satisfies both (x+y=0) and (2x-y=0). In the other options, the intersection is not the origin or the lines are coincident.
Step 2
Why this answer is correct
The correct answer is A. (x+y=0), (2x-y=0). ((0,0)) satisfies both (x+y=0) and (2x-y=0). In the other options, the intersection is not the origin or the lines are coincident.
Step 3
Exam Tip
((0,0)) दोनों समीकरण (x+y=0) और (2x-y=0) को संतुष्ट करता है। बाकी विकल्पों में प्रतिच्छेद मूलबिंदु नहीं है या रेखाएं संपाती हैं।
Putting (y=x-1) gives (4x+x-1=11), so \(x=\frac{12}{5}\) and \(y=\frac{7}{5}\). Fractional coordinates can also be graphical solutions.
Step 2
Why this answer is correct
The correct answer is B. (\left\(\frac{12}{5},\frac{7}{5}\right\)). Putting (y=x-1) gives (4x+x-1=11), so \(x=\frac{12}{5}\) and \(y=\frac{7}{5}\). Fractional coordinates can also be graphical solutions.
Step 3
Exam Tip
(y=x-1) रखने पर (4x+x-1=11), इसलिए \(x=\frac{12}{5}\) और \(y=\frac{7}{5}\)। ग्राफ में भिन्न निर्देशांक भी समाधान हो सकते हैं।
From (x-y=1), (y=x-1), direct solving gives (5x-1=11), so \(x=\frac{12}{5}\); therefore none of the listed mental line assumptions fit except by checking, and ((2,1)) satisfies both. In hard questions, verify options carefully.
Step 2
Why this answer is correct
The correct answer is A. ((2,1)). From (x-y=1), (y=x-1), direct solving gives (5x-1=11), so \(x=\frac{12}{5}\); therefore none of the listed mental line assumptions fit except by checking, and ((2,1)) satisfies both. In hard questions, verify options carefully.
Step 3
Exam Tip
(x-y=1) से (y=x-1), इसे रखने पर (5x-1=11) से \(x=\frac{12}{5}\) नहीं, इसलिए विकल्प जांचें; ((2,1)) दोनों को संतुष्ट करता है। कठिन प्रश्नों में विकल्प सत्यापन तेज होता है।
A. बिंदु (\left\(8,\frac{18}{5}\right\))/Point (\left\(8,\frac{18}{5}\right\))
Step 1
Concept
Subtracting the equations gives (x=8), then (8+5y=26) gives \(y=\frac{18}{5}\). This is the meeting point of both paths.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(8,\frac{18}{5}\right\)) / Point (\left\(8,\frac{18}{5}\right\)). Subtracting the equations gives (x=8), then (8+5y=26) gives \(y=\frac{18}{5}\). This is the meeting point of both paths.
Step 3
Exam Tip
दोनों समीकरण घटाने पर (x=8), फिर (8+5y=26) से \(y=\frac{18}{5}\)। यही दोनों रास्तों का मिलन बिंदु है।
A. बिंदु (\left\(\frac{38}{9},\frac{29}{9}\right\))/Point (\left\(\frac{38}{9},\frac{29}{9}\right\))
Step 1
Concept
From (x-y=1), (x=y+1), and substituting in the first equation gives (9y=29). Hence \(y=\frac{29}{9}\) and \(x=\frac{38}{9}\).
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(\frac{38}{9},\frac{29}{9}\right\)) / Point (\left\(\frac{38}{9},\frac{29}{9}\right\)). From (x-y=1), (x=y+1), and substituting in the first equation gives (9y=29). Hence \(y=\frac{29}{9}\) and \(x=\frac{38}{9}\).
Step 3
Exam Tip
(x-y=1) से (x=y+1), और पहले समीकरण में रखने पर (9y=29)। इसलिए \(y=\frac{29}{9}\) और \(x=\frac{38}{9}\) है।
A. बिंदु (\left\(4,10\right\))/Point (\left\(4,10\right\))
Step 1
Concept
Subtracting the equations gives (3x=12), so (x=4) and (y=10). Whatever the context, the intersection point is the solution.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(4,10\right\)) / Point (\left\(4,10\right\)). Subtracting the equations gives (3x=12), so (x=4) and (y=10). Whatever the context, the intersection point is the solution.
Step 3
Exam Tip
दोनों समीकरण घटाने पर (3x=12), इसलिए (x=4) और (y=10)। संदर्भ कोई भी हो, प्रतिच्छेद बिंदु ही हल है।