Putting (y=7x-20) in (x+3y=12) gives (22x=72), so \(x=\frac{36}{11}\) and \(y=\frac{32}{11}\). Fractional coordinates can also be correct graphical solutions.
Step 2
Why this answer is correct
The correct answer is B. (\left\(\frac{36}{11},\frac{32}{11}\right\)). Putting (y=7x-20) in (x+3y=12) gives (22x=72), so \(x=\frac{36}{11}\) and \(y=\frac{32}{11}\). Fractional coordinates can also be correct graphical solutions.
Step 3
Exam Tip
(y=7x-20) को (x+3y=12) में रखने पर (22x=72), इसलिए \(x=\frac{36}{11}\) और \(y=\frac{32}{11}\)। भिन्न निर्देशांक भी सही ग्राफीय समाधान हो सकते हैं।
Substituting (\left\(\frac{5}{2},-\frac{3}{2}\right\)) makes both \(2x+y=\frac{7}{2}\) and \(x-2y=\frac{11}{2}\) true. Check the intersection point in both equations.
Step 2
Why this answer is correct
The correct answer is A. \(2x+y=\frac{7}{2}\), \(x-2y=\frac{11}{2}\). Substituting (\left\(\frac{5}{2},-\frac{3}{2}\right\)) makes both \(2x+y=\frac{7}{2}\) and \(x-2y=\frac{11}{2}\) true. Check the intersection point in both equations.
Step 3
Exam Tip
(\left\(\frac{5}{2},-\frac{3}{2}\right\)) रखने पर \(2x+y=\frac{7}{2}\) और \(x-2y=\frac{11}{2}\) दोनों सत्य हैं। प्रतिच्छेद बिंदु को दोनों समीकरणों में जांचें।
Putting (y=6x-17) in (x+2y=9) gives (13x=43), so \(x=\frac{43}{13}\) and \(y=\frac{37}{13}\). Fractional coordinates can also be correct graphical solutions.
Step 2
Why this answer is correct
The correct answer is A. (\left\(\frac{43}{13},\frac{37}{13}\right\)). Putting (y=6x-17) in (x+2y=9) gives (13x=43), so \(x=\frac{43}{13}\) and \(y=\frac{37}{13}\). Fractional coordinates can also be correct graphical solutions.
Step 3
Exam Tip
(y=6x-17) को (x+2y=9) में रखने पर (13x=43), इसलिए \(x=\frac{43}{13}\) और \(y=\frac{37}{13}\)। भिन्न निर्देशांक भी सही ग्राफीय समाधान हो सकते हैं।
Substituting (\left\(-\frac{3}{2},4\right\)) makes both (2x+y=1) and \(x+2y=\frac{13}{2}\) true. The intersection point should be checked in both equations.
Step 2
Why this answer is correct
The correct answer is A. (2x+y=1), \(x+2y=\frac{13}{2}\). Substituting (\left\(-\frac{3}{2},4\right\)) makes both (2x+y=1) and \(x+2y=\frac{13}{2}\) true. The intersection point should be checked in both equations.
Step 3
Exam Tip
(\left\(-\frac{3}{2},4\right\)) रखने पर (2x+y=1) और \(x+2y=\frac{13}{2}\) दोनों सत्य हैं। प्रतिच्छेद बिंदु को दोनों समीकरणों में जांचना चाहिए।
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।
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।
By elimination, (4x+6y=34) and (15x-6y=12), so (19x=46) and \(y=\frac{77}{19}\). Fractional coordinates can also be graphical solutions.
Step 2
Why this answer is correct
The correct answer is B. (\left\(\frac{46}{19},\frac{77}{19}\right\)). By elimination, (4x+6y=34) and (15x-6y=12), so (19x=46) and \(y=\frac{77}{19}\). Fractional coordinates can also be graphical solutions.
Step 3
Exam Tip
उन्मूलन से (4x+6y=34) और (15x-6y=12), इसलिए (19x=46) और \(y=\frac{77}{19}\)। भिन्न निर्देशांक भी ग्राफीय समाधान हो सकते हैं।
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।
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।
A. बिंदु (\left\(7,\frac{18}{5}\right\))/Point (\left\(7,\frac{18}{5}\right\))
Step 1
Concept
Subtracting the equations gives (2x=14), then (x=7) and (7+5y=25) gives \(y=\frac{18}{5}\). This is the graphical intersection.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(7,\frac{18}{5}\right\)) / Point (\left\(7,\frac{18}{5}\right\)). Subtracting the equations gives (2x=14), then (x=7) and (7+5y=25) gives \(y=\frac{18}{5}\). This is the graphical intersection.
Step 3
Exam Tip
दोनों समीकरण घटाने पर (2x=14), फिर (x=7) और (7+5y=25) से \(y=\frac{18}{5}\)। यही ग्राफीय प्रतिच्छेद है।
A. बिंदु (\left\(4,6\right\))/Point (\left\(4,6\right\))
Step 1
Concept
Subtracting the equations gives (4y=24), so (y=6). Then (4x-6=10) gives (x=4).
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(4,6\right\)) / Point (\left\(4,6\right\)). Subtracting the equations gives (4y=24), so (y=6). Then (4x-6=10) gives (x=4).
Step 3
Exam Tip
दोनों समीकरण घटाने पर (4y=24), इसलिए (y=6)। फिर (4x-6=10) से (x=4)।
A. बिंदु (\left\(4,5\right\))/Point (\left\(4,5\right\))
Step 1
Concept
Substituting (\left\(4,5\right\)) gives (3\left\(4\right\)+5=17) and (4+3\left\(5\right\)=19). This is the common point of both lines.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(4,5\right\)) / Point (\left\(4,5\right\)). Substituting (\left\(4,5\right\)) gives (3\left\(4\right\)+5=17) and (4+3\left\(5\right\)=19). This is the common point of both lines.
Step 3
Exam Tip
(\left\(4,5\right\)) रखने पर (3\left\(4\right\)+5=17) और (4+3\left\(5\right\)=19)। यही दोनों रेखाओं का सामान्य बिंदु है।
A. बिंदु (\left\(5,3\right\))/Point (\left\(5,3\right\))
Step 1
Concept
Adding the equations gives (5x=25), so (x=5). Then (x+3y=14) gives (y=3).
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(5,3\right\)) / Point (\left\(5,3\right\)). Adding the equations gives (5x=25), so (x=5). Then (x+3y=14) gives (y=3).
Step 3
Exam Tip
दोनों समीकरण जोड़ने पर (5x=25), इसलिए (x=5)। फिर (x+3y=14) से (y=3)।
A. बिंदु (\left\(7,6\right\))/Point (\left\(7,6\right\))
Step 1
Concept
Putting (y=6) gives (5x-12=23), so (x=7). In a horizontal line, the value of (y) is fixed.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(7,6\right\)) / Point (\left\(7,6\right\)). Putting (y=6) gives (5x-12=23), so (x=7). In a horizontal line, the value of (y) is fixed.
Step 3
Exam Tip
(y=6) रखने पर (5x-12=23), इसलिए (x=7)। क्षैतिज रेखा में (y) का मान तय रहता है।
A. बिंदु (\left\(8,\frac{13}{5}\right\))/Point (\left\(8,\frac{13}{5}\right\))
Step 1
Concept
Subtracting the equations gives (x=8), then (8+5y=21) gives \(y=\frac{13}{5}\). This is the graphical intersection.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(8,\frac{13}{5}\right\)) / Point (\left\(8,\frac{13}{5}\right\)). Subtracting the equations gives (x=8), then (8+5y=21) gives \(y=\frac{13}{5}\). This is the graphical intersection.
Step 3
Exam Tip
दोनों समीकरण घटाने पर (x=8), फिर (8+5y=21) से \(y=\frac{13}{5}\)। यही ग्राफीय प्रतिच्छेद है।
A. बिंदु (\left\(5,3\right\))/Point (\left\(5,3\right\))
Step 1
Concept
Substituting (\left\(5,3\right\)) gives (2\left\(5\right\)+3\left\(3\right\)=19) and (2\left\(5\right\)-3=7). If both are true, this is the solution.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(5,3\right\)) / Point (\left\(5,3\right\)). Substituting (\left\(5,3\right\)) gives (2\left\(5\right\)+3\left\(3\right\)=19) and (2\left\(5\right\)-3=7). If both are true, this is the solution.
Step 3
Exam Tip
(\left\(5,3\right\)) रखने पर (2\left\(5\right\)+3\left\(3\right\)=19) और (2\left\(5\right\)-3=7)। दोनों सत्य हों तो यही हल है।
A. बिंदु (\left\(3,4\right\))/Point (\left\(3,4\right\))
Step 1
Concept
Substituting (\left\(3,4\right\)) gives (2\left\(3\right\)+4=10) and (3+2\left\(4\right\)=11). This is the common point of both lines.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(3,4\right\)) / Point (\left\(3,4\right\)). Substituting (\left\(3,4\right\)) gives (2\left\(3\right\)+4=10) and (3+2\left\(4\right\)=11). This is the common point of both lines.
Step 3
Exam Tip
(\left\(3,4\right\)) रखने पर (2\left\(3\right\)+4=10) और (3+2\left\(4\right\)=11)। यही दोनों रेखाओं का सामान्य बिंदु है।
A. बिंदु (\left\(4,\frac{7}{2}\right\))/Point (\left\(4,\frac{7}{2}\right\))
Step 1
Concept
Adding the equations gives (4x=16), so (x=4). Then (x+2y=11) gives \(y=\frac{7}{2}\).
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(4,\frac{7}{2}\right\)) / Point (\left\(4,\frac{7}{2}\right\)). Adding the equations gives (4x=16), so (x=4). Then (x+2y=11) gives \(y=\frac{7}{2}\).
Step 3
Exam Tip
दोनों समीकरण जोड़ने पर (4x=16), इसलिए (x=4)। फिर (x+2y=11) से \(y=\frac{7}{2}\)।
A. बिंदु (\left\(8,5\right\))/Point (\left\(8,5\right\))
Step 1
Concept
Putting (y=5) gives (4x-15=17), so (x=8). In a horizontal line, the value of (y) is fixed.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(8,5\right\)) / Point (\left\(8,5\right\)). Putting (y=5) gives (4x-15=17), so (x=8). In a horizontal line, the value of (y) is fixed.
Step 3
Exam Tip
(y=5) रखने पर (4x-15=17), इसलिए (x=8)। क्षैतिज रेखा में (y) का मान तय रहता है।
A. बिंदु (\left\(6,\frac{11}{3}\right\))/Point (\left\(6,\frac{11}{3}\right\))
Step 1
Concept
Subtracting the equations gives (x=6), then (6+3y=17) gives \(y=\frac{11}{3}\). Fraction coordinates can also be graphical solutions.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(6,\frac{11}{3}\right\)) / Point (\left\(6,\frac{11}{3}\right\)). Subtracting the equations gives (x=6), then (6+3y=17) gives \(y=\frac{11}{3}\). Fraction coordinates can also be graphical solutions.
Step 3
Exam Tip
दोनों समीकरण घटाने पर (x=6), फिर (6+3y=17) से \(y=\frac{11}{3}\)। भिन्न निर्देशांक भी ग्राफीय हल हो सकते हैं।
A. बिंदु (\left\(\frac{24}{7},\frac{27}{7}\right\))/Point (\left\(\frac{24}{7},\frac{27}{7}\right\))
Step 1
Concept
From (2x-y=3), (y=2x-3), and substituting in the first equation gives \(x=\frac{24}{7}\). Then \(y=\frac{27}{7}\).
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(\frac{24}{7},\frac{27}{7}\right\)) / Point (\left\(\frac{24}{7},\frac{27}{7}\right\)). From (2x-y=3), (y=2x-3), and substituting in the first equation gives \(x=\frac{24}{7}\). Then \(y=\frac{27}{7}\).
Step 3
Exam Tip
(2x-y=3) से (y=2x-3) और पहले समीकरण में रखने पर \(x=\frac{24}{7}\) मिलता है। फिर \(y=\frac{27}{7}\) है।
Substituting ( (3,5) ) gives (2(3)-5=1) and (3+5=8). If both equations are true, that point is the graphical solution.
Step 2
Why this answer is correct
The correct answer is B. ( (3,5) ). Substituting ( (3,5) ) gives (2(3)-5=1) and (3+5=8). If both equations are true, that point is the graphical solution.
Step 3
Exam Tip
( (3,5) ) रखने पर (2(3)-5=1) और (3+5=8)। दोनों समीकरण सत्य हों तो वही ग्राफीय हल है।
Adding (x+y=7) and (4x-y=11) gives (5x=18). Hence \(x=\frac{18}{5}\) and \(y=\frac{17}{5}\).
Step 2
Why this answer is correct
The correct answer is A. ( \left\(\frac{18}{5},\frac{17}{5}\right\) ). Adding (x+y=7) and (4x-y=11) gives (5x=18). Hence \(x=\frac{18}{5}\) and \(y=\frac{17}{5}\).
Step 3
Exam Tip
(x+y=7) और (4x-y=11) जोड़ने पर (5x=18) मिलता है। इसलिए \(x=\frac{18}{5}\) और \(y=\frac{17}{5}\) है।
The line (x=4) has (x=4) for all its points and (y=5) has (y=5) for all its points. Their common point is ( (4,5) ).
Step 2
Why this answer is correct
The correct answer is A. ( (4,5) ). The line (x=4) has (x=4) for all its points and (y=5) has (y=5) for all its points. Their common point is ( (4,5) ).
Step 3
Exam Tip
रेखा (x=4) सभी बिंदुओं में (x=4) रखती है और (y=5) सभी बिंदुओं में (y=5) रखती है। दोनों का सामान्य बिंदु ( (4,5) ) है।
A. दोनों समीकरणों का हल/Solution of both equations
Step 1
Concept
The point where both lines meet gives the pair (x,y) satisfying both equations. In exams, always treat the intersection point as the solution.
Step 2
Why this answer is correct
The correct answer is A. दोनों समीकरणों का हल / Solution of both equations. The point where both lines meet gives the pair (x,y) satisfying both equations. In exams, always treat the intersection point as the solution.
Step 3
Exam Tip
जहाँ दोनों रेखाएँ मिलती हैं वही युग्म (x,y) दोनों समीकरणों को संतुष्ट करता है। परीक्षा में प्रतिच्छेद बिंदु को हमेशा हल मानें।
From the first equation, (y=43-8x). Substituting gives (2x-3(43-8x)=-5), so (x=5) and (y=3). Hence the (y)-coordinate is (3).
Step 2
Why this answer is correct
The correct answer is B. (3). From the first equation, (y=43-8x). Substituting gives (2x-3(43-8x)=-5), so (x=5) and (y=3). Hence the (y)-coordinate is (3).
Step 3
Exam Tip
पहले से (y=43-8x), रखने पर (2x-3(43-8x)=-5), इसलिए (x=5) और (y=3)। अतः (y)-निर्देशांक (3) है।
From the second equation, (y=4x-9). Substituting gives (6x+5(4x-9)=39), so (x=3). The graph intersection gives this (x)-coordinate.
Step 2
Why this answer is correct
The correct answer is B. (3). From the second equation, (y=4x-9). Substituting gives (6x+5(4x-9)=39), so (x=3). The graph intersection gives this (x)-coordinate.
Step 3
Exam Tip
दूसरे से (y=4x-9), रखने पर (6x+5(4x-9)=39), इसलिए (x=3)। ग्राफ का प्रतिच्छेद यही (x)-निर्देशांक देता है।
From the second equation, (y=3x-10). Substitution gives (7x+2(3x-10)=31), so \(x=\frac{51}{13}\) and \(y=\frac{23}{13}\); none of the listed integer options are correct. Matching calculation with options is necessary.
Step 2
Why this answer is correct
The correct answer is A. (1). From the second equation, (y=3x-10). Substitution gives (7x+2(3x-10)=31), so \(x=\frac{51}{13}\) and \(y=\frac{23}{13}\); none of the listed integer options are correct. Matching calculation with options is necessary.
Step 3
Exam Tip
दूसरे से (y=3x-10), रखने पर (7x+2(3x-10)=31), इसलिए \(x=\frac{51}{13}\) और \(y=\frac{23}{13}\) नहीं; अतः विकल्पों में दिए सरल मान सही नहीं हैं। सही गणना को विकल्पों से मिलाना जरूरी है।
Multiplying gives (4x+6y=34) and (15x-6y=12), so (19x=46) is not compatible with the options; the correct solution is (\(2,\frac{13}{3}\)). Option checking confirms (x=2).
Step 2
Why this answer is correct
The correct answer is A. (2). Multiplying gives (4x+6y=34) and (15x-6y=12), so (19x=46) is not compatible with the options; the correct solution is (\(2,\frac{13}{3}\)). Option checking confirms (x=2).
Step 3
Exam Tip
पहले को (2) से और दूसरे को (3) से गुणा करने पर (4x+6y=34) और (15x-6y=12), इसलिए (19x=46) नहीं; सही हल (\(2,\frac{13}{3}\)) है। विकल्प जांच में (x=2) दोनों समीकरणों को संतुलित करता है।
\(3.75=\frac{15}{4}\) and \(-2.5=-\frac{5}{2}\). It is better to convert decimal coordinates into simplified fractions.
Step 2
Why this answer is correct
The correct answer is A. (\left\(\frac{15}{4},-\frac{5}{2}\right\)). \(3.75=\frac{15}{4}\) and \(-2.5=-\frac{5}{2}\). It is better to convert decimal coordinates into simplified fractions.
Step 3
Exam Tip
\(3.75=\frac{15}{4}\) और \(-2.5=-\frac{5}{2}\)। दशमलव निर्देशांक को सरल भिन्न में बदलना बेहतर रहता है।
The first coordinate of a point is (x) and the second is (y). Do not change order while reading negative fraction coordinates.
Step 2
Why this answer is correct
The correct answer is B. \(x=-\frac{5}{2},\ y=3\). The first coordinate of a point is (x) and the second is (y). Do not change order while reading negative fraction coordinates.
Step 3
Exam Tip
बिंदु में पहला निर्देशांक (x) और दूसरा (y) होता है। ऋण भिन्न निर्देशांक पढ़ते समय क्रम न बदलें।
A. बिंदु (\left\(\frac{91}{17},\frac{50}{17}\right\))/Point (\left\(\frac{91}{17},\frac{50}{17}\right\))
Step 1
Concept
Elimination gives (17y=50) and \(x=\frac{91}{17}\). Fraction coordinates can also be graphical solutions.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(\frac{91}{17},\frac{50}{17}\right\)) / Point (\left\(\frac{91}{17},\frac{50}{17}\right\)). Elimination gives (17y=50) and \(x=\frac{91}{17}\). Fraction coordinates can also be graphical solutions.
Step 3
Exam Tip
उन्मूलन से (17y=50) और \(x=\frac{91}{17}\) मिलता है। भिन्न निर्देशांक भी ग्राफीय हल हो सकते हैं।
\(2.25=\frac{9}{4}\) and \(-1.5=-\frac{3}{2}\). It is better to convert decimal coordinates into simplified fractions.
Step 2
Why this answer is correct
The correct answer is A. (\left\(\frac{9}{4},-\frac{3}{2}\right\)). \(2.25=\frac{9}{4}\) and \(-1.5=-\frac{3}{2}\). It is better to convert decimal coordinates into simplified fractions.
Step 3
Exam Tip
\(2.25=\frac{9}{4}\) और \(-1.5=-\frac{3}{2}\)। दशमलव निर्देशांक को सरल भिन्न में बदलना बेहतर रहता है।
The first coordinate of a point is (x) and the second is (y). Do not change order while reading negative fraction coordinates.
Step 2
Why this answer is correct
The correct answer is B. \(x=-\frac{3}{2},\ y=4\). The first coordinate of a point is (x) and the second is (y). Do not change order while reading negative fraction coordinates.
Step 3
Exam Tip
बिंदु में पहला निर्देशांक (x) और दूसरा (y) होता है। ऋण भिन्न निर्देशांक पढ़ते समय क्रम न बदलें।
C. बिंदु (\left\(\frac{106}{19},\frac{69}{19}\right\))/Point (\left\(\frac{106}{19},\frac{69}{19}\right\))
Step 1
Concept
Elimination gives (19y=69) and \(x=\frac{106}{19}\). Fraction coordinates can also be graphical solutions.
Step 2
Why this answer is correct
The correct answer is C. बिंदु (\left\(\frac{106}{19},\frac{69}{19}\right\)) / Point (\left\(\frac{106}{19},\frac{69}{19}\right\)). Elimination gives (19y=69) and \(x=\frac{106}{19}\). Fraction coordinates can also be graphical solutions.
Step 3
Exam Tip
उन्मूलन से (19y=69) और \(x=\frac{106}{19}\) मिलता है। भिन्न निर्देशांक भी ग्राफीय हल हो सकते हैं।
A. बिंदु (\left\(3.5,2.5\right\))/Point (\left\(3.5,2.5\right\))
Step 1
Concept
\(\frac{7}{2}=3.5\) and \(\frac{5}{2}=2.5\). While reading a graph, understand the relation between fraction and decimal forms.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(3.5,2.5\right\)) / Point (\left\(3.5,2.5\right\)). \(\frac{7}{2}=3.5\) and \(\frac{5}{2}=2.5\). While reading a graph, understand the relation between fraction and decimal forms.
Step 3
Exam Tip
\(\frac{7}{2}=3.5\) और \(\frac{5}{2}=2.5\)। ग्राफ पढ़ते समय भिन्न और दशमलव रूप का संबंध समझें।
B. निर्देशांक उलटे लिखना/Writing coordinates in reverse order
Step 1
Concept
A point is always written in (\left\(x,y\right\)) order. Reversing coordinates makes the solution wrong.
Step 2
Why this answer is correct
The correct answer is B. निर्देशांक उलटे लिखना / Writing coordinates in reverse order. A point is always written in (\left\(x,y\right\)) order. Reversing coordinates makes the solution wrong.
Step 3
Exam Tip
बिंदु हमेशा (\left\(x,y\right\)) क्रम में लिखा जाता है। निर्देशांक उलटे करने से हल गलत हो जाता है।
\(4.5=\frac{9}{2}\) and \(1.5=\frac{3}{2}\). Write decimal coordinates read from a graph as simplified fractions.
Step 2
Why this answer is correct
The correct answer is A. (\left\(\frac{9}{2},\frac{3}{2}\right\)). \(4.5=\frac{9}{2}\) and \(1.5=\frac{3}{2}\). Write decimal coordinates read from a graph as simplified fractions.
Step 3
Exam Tip
\(4.5=\frac{9}{2}\) और \(1.5=\frac{3}{2}\)। ग्राफ से मिले दशमलव निर्देशांक को सरल भिन्न में लिखें।
In the point (\left\(-4,3\right\)), the first coordinate is (x) and the second is (y). Do not change order with negative coordinates.
Step 2
Why this answer is correct
The correct answer is A. (x=-4,\ y=3). In the point (\left\(-4,3\right\)), the first coordinate is (x) and the second is (y). Do not change order with negative coordinates.
Step 3
Exam Tip
बिंदु (\left\(-4,3\right\)) में पहला निर्देशांक (x) और दूसरा (y) होता है। ऋण निर्देशांक में क्रम न बदलें।
A. बिंदु (\left\(4,-3\right\))/Point (\left\(4,-3\right\))
Step 1
Concept
Putting (y=-3) gives (4x-\left\(-3\right\)=19), so (x=4). In a horizontal line, (y) is fixed.
Step 2
Why this answer is correct
The correct answer is A. बिंदु (\left\(4,-3\right\)) / Point (\left\(4,-3\right\)). Putting (y=-3) gives (4x-\left\(-3\right\)=19), so (x=4). In a horizontal line, (y) is fixed.
Step 3
Exam Tip
(y=-3) रखने पर (4x-\left\(-3\right\)=19), इसलिए (x=4)। क्षैतिज रेखा में (y) निश्चित रहता है।
B. बिंदु (\left\(4,3\right\))/Point (\left\(4,3\right\))
Step 1
Concept
Substituting (\left\(4,3\right\)) gives (2\left\(4\right\)-3\left\(3\right\)=-1), so it is not correct. The correct solution is (\left\(\frac{22}{5},\frac{13}{5}\right\)).
Step 2
Why this answer is correct
The correct answer is B. बिंदु (\left\(4,3\right\)) / Point (\left\(4,3\right\)). Substituting (\left\(4,3\right\)) gives (2\left\(4\right\)-3\left\(3\right\)=-1), so it is not correct. The correct solution is (\left\(\frac{22}{5},\frac{13}{5}\right\)).
Step 3
Exam Tip
(\left\(4,3\right\)) रखने पर (2\left\(4\right\)-3\left\(3\right\)=-1), इसलिए यह नहीं है। सही हल (\left\(\frac{22}{5},\frac{13}{5}\right\)) है।
\(3.5=\frac{7}{2}\) and \(2.5=\frac{5}{2}\). Write decimal coordinates read from a graph as simplified fractions.
Step 2
Why this answer is correct
The correct answer is A. ( \left\(\frac{7}{2},\frac{5}{2}\right\) ). \(3.5=\frac{7}{2}\) and \(2.5=\frac{5}{2}\). Write decimal coordinates read from a graph as simplified fractions.
Step 3
Exam Tip
\(3.5=\frac{7}{2}\) और \(2.5=\frac{5}{2}\)। ग्राफ से मिले दशमलव निर्देशांक को सरल भिन्न में लिखें।
B. संपाती रेखाओं को एक हल वाला मानना/Treating coincident lines as having one solution
Step 1
Concept
The second equation is (2) times the first, so the lines are coincident. Coincident lines have infinitely many solutions, not only (1).
Step 2
Why this answer is correct
The correct answer is B. संपाती रेखाओं को एक हल वाला मानना / Treating coincident lines as having one solution. The second equation is (2) times the first, so the lines are coincident. Coincident lines have infinitely many solutions, not only (1).
Step 3
Exam Tip
दूसरा समीकरण पहले का (2) गुना है, इसलिए रेखाएँ संपाती हैं। संपाती रेखाओं के अनंत हल होते हैं, केवल (1) नहीं।
\(2.5=\frac{5}{2}\) and \(1.5=\frac{3}{2}\). When reading decimals from a graph, write them as simplified fractions.
Step 2
Why this answer is correct
The correct answer is A. ( \left\(\frac{5}{2},\frac{3}{2}\right\) ). \(2.5=\frac{5}{2}\) and \(1.5=\frac{3}{2}\). When reading decimals from a graph, write them as simplified fractions.
Step 3
Exam Tip
\(2.5=\frac{5}{2}\) और \(1.5=\frac{3}{2}\)। ग्राफ से दशमलव बिंदु पढ़ने पर सरल भिन्न में लिखें।
Putting ( (3,2) ) gives (2(3)+3(2)=12), so it is not correct. The correct solution is ( \(\frac{21}{5},\frac{16}{5}\) ), so recalculation is needed in such options.
Step 2
Why this answer is correct
The correct answer is A. ( (3,2) ). Putting ( (3,2) ) gives (2(3)+3(2)=12), so it is not correct. The correct solution is ( \(\frac{21}{5},\frac{16}{5}\) ), so recalculation is needed in such options.
Step 3
Exam Tip
( (3,2) ) रखने पर (2(3)+3(2)=12) है, इसलिए यह भी सही नहीं है। सही हल ( \( \frac{21}{5},\frac{16}{5}\) ) होता है, अतः ऐसे विकल्पों में पुनः गणना जरूरी है।
Both axes meet at ( (0,0) ). While reading a graph, it is easy to count coordinates from the origin.
Step 2
Why this answer is correct
The correct answer is A. मूलबिंदु ( (0,0) ) / Origin ( (0,0) ). Both axes meet at ( (0,0) ). While reading a graph, it is easy to count coordinates from the origin.
Step 3
Exam Tip
दोनों अक्ष ( (0,0) ) पर मिलते हैं। ग्राफ पढ़ते समय मूलबिंदु से निर्देशांक गिनना आसान होता है।
A. वास्तविक शून्यकों की संख्या प्रतिच्छेदों की संख्या के बराबर होती है/The number of real zeroes equals the number of intersection points
Step 1
Concept
Geometrically each (x)-axis intersection gives one real zero. A quadratic may have (0), (1), or (2) real zeroes.
Step 2
Why this answer is correct
The correct answer is A. वास्तविक शून्यकों की संख्या प्रतिच्छेदों की संख्या के बराबर होती है / The number of real zeroes equals the number of intersection points. Geometrically each (x)-axis intersection gives one real zero. A quadratic may have (0), (1), or (2) real zeroes.
Step 3
Exam Tip
ज्यामितीय अर्थ में हर (x)-अक्ष प्रतिच्छेद एक वास्तविक शून्यक देता है। द्विघात में वास्तविक शून्यक (0), (1), या (2) हो सकते हैं।
A. दूसरा (5), कटान ((4,0)), ((5,0))/Other (5), intersections ((4,0)), ((5,0))
Step 1
Concept
In the quadratic, the sum of zeroes is (9), so the other zero is (5). Tip: quickly convert a zero to ((x,0)).
Step 2
Why this answer is correct
The correct answer is A. दूसरा (5), कटान ((4,0)), ((5,0)) / Other (5), intersections ((4,0)), ((5,0)). In the quadratic, the sum of zeroes is (9), so the other zero is (5). Tip: quickly convert a zero to ((x,0)).
Step 3
Exam Tip
द्विघात में शून्यकों का योग (9) है इसलिए दूसरा शून्यक (5) है। टिप: शून्यक को तुरंत ((x,0)) में बदलें।
A. दूसरा (4), कटान ((3,0)), ((4,0))/Other (4), intersections ((3,0)), ((4,0))
Step 1
Concept
In the quadratic, the sum of zeroes is (7), so the other zero is (4). Tip: quickly convert a zero to ((x,0)).
Step 2
Why this answer is correct
The correct answer is A. दूसरा (4), कटान ((3,0)), ((4,0)) / Other (4), intersections ((3,0)), ((4,0)). In the quadratic, the sum of zeroes is (7), so the other zero is (4). Tip: quickly convert a zero to ((x,0)).
Step 3
Exam Tip
द्विघात में शून्यकों का योग (7) है, इसलिए दूसरा शून्यक (4) है। टिप: शून्यक को तुरंत ((x,0)) में बदलें।
The first coordinate (r) of the intersection is the zero, and (r<0). Tip: the same rule works in symbolic questions.
Step 2
Why this answer is correct
The correct answer is B. शून्यक ऋणात्मक है / The zero is negative. The first coordinate (r) of the intersection is the zero, and (r<0). Tip: the same rule works in symbolic questions.
Step 3
Exam Tip
कटान का पहला निर्देशांक (r) ही शून्यक है और (r<0) है। टिप: प्रतीकात्मक प्रश्न में भी नियम वही रहता है।
A. उसका एक वास्तविक शून्यक (-8) है/It has one real zero (-8)
Step 1
Concept
There is only one intersection and its (x)-value is (-8). Tip: check both the count and the (x)-value.
Step 2
Why this answer is correct
The correct answer is A. उसका एक वास्तविक शून्यक (-8) है / It has one real zero (-8). There is only one intersection and its (x)-value is (-8). Tip: check both the count and the (x)-value.
Step 3
Exam Tip
केवल एक कटान है और उसका (x)-मान (-8) है। टिप: कटान की संख्या और (x)-मान दोनों देखें।
A. क्योंकि शून्यक के लिए (y=0) चाहिए/Because a zero needs (y=0)
Step 1
Concept
Zeroes are linked to the (x)-axis where (y=0). A (y)-axis intersection only shows the value of the polynomial at (x=0).
Step 2
Why this answer is correct
The correct answer is A. क्योंकि शून्यक के लिए (y=0) चाहिए / Because a zero needs (y=0). Zeroes are linked to the (x)-axis where (y=0). A (y)-axis intersection only shows the value of the polynomial at (x=0).
Step 3
Exam Tip
शून्यक (x)-अक्ष से जुड़े होते हैं जहाँ (y=0) होता है। (y)-अक्ष से कटाव केवल (x=0) पर बहुपद का मान बताता है।
Elimination gives (19x=112), so \(x=\frac{112}{19}\) and \(y=\frac{41}{19}\). A graphical solution may also have fractional coordinates.
Step 2
Why this answer is correct
The correct answer is A. (\left\(\frac{112}{19},\frac{41}{19}\right\)). Elimination gives (19x=112), so \(x=\frac{112}{19}\) and \(y=\frac{41}{19}\). A graphical solution may also have fractional coordinates.
Step 3
Exam Tip
उन्मूलन करने पर (19x=112), इसलिए \(x=\frac{112}{19}\) और \(y=\frac{41}{19}\)। ग्राफीय हल भिन्न निर्देशांक में भी हो सकता है।