The numerator exponent is ((m+2)+(3-m)=5), and \(\frac{a^{5}}{a^{4}}=a\). In exams, add and subtract exponents only for the same base.
Step 2
Why this answer is correct
The correct answer is A. (a). The numerator exponent is ((m+2)+(3-m)=5), and \(\frac{a^{5}}{a^{4}}=a\). In exams, add and subtract exponents only for the same base.
Step 3
Exam Tip
ऊपर की घातें ((m+2)+(3-m)=5) हैं और \(\frac{a^{5}}{a^{4}}=a\)। परीक्षा में समान आधार की घातों को जोड़ना और घटाना याद रखें।
Here (\left\(2x^{-3}\right\)^{-2}=2^{-2}x^{6}=\frac{x^{6}}{4}), so multiplying by \(x^{-1}\) gives \(\frac{x^{5}}{4}\). In exams, first convert negative exponents carefully.
Step 2
Why this answer is correct
The correct answer is A. \(\frac{x^{5}}{4}\). Here (\left\(2x^{-3}\right\)^{-2}=2^{-2}x^{6}=\frac{x^{6}}{4}), so multiplying by \(x^{-1}\) gives \(\frac{x^{5}}{4}\). In exams, first convert negative exponents carefully.
Step 3
Exam Tip
(\left\(2x^{-3}\right\)^{-2}=2^{-2}x^{6}=\frac{x^{6}}{4}), इसलिए \(x^{-1}\) से गुणा करने पर \(\frac{x^{5}}{4}\) मिलता है। परीक्षा में ऋणात्मक घात को पहले धनात्मक रूप में बदलें।
(\(2^5\)^{\frac{2}{5}}=22=4) and (\(3^3\)^{\frac{1}{3}}=3), so the product is (12). In exams, apply the power of a power law.
Step 2
Why this answer is correct
The correct answer is A. (,12,). (\(2^5\)^{\frac{2}{5}}=22=4) and (\(3^3\)^{\frac{1}{3}}=3), so the product is (12). In exams, apply the power of a power law.
Step 3
Exam Tip
(\(2^5\)^{\frac{2}{5}}=22=4) और (\(3^3\)^{\frac{1}{3}}=3), इसलिए गुणनफल (12) है। परीक्षा में power of power नियम लगाएं।
The numerator is \(a^{-1}+b^{-1}=\dfrac{a+b}{ab}\) and the denominator is ((ab)^{-1}=\dfrac{1}{ab}), so the answer is (a+b). In exams, make a common denominator.
Step 2
Why this answer is correct
The correct answer is A. (,a+b,). The numerator is \(a^{-1}+b^{-1}=\dfrac{a+b}{ab}\) and the denominator is ((ab)^{-1}=\dfrac{1}{ab}), so the answer is (a+b). In exams, make a common denominator.
Step 3
Exam Tip
ऊपर \(a^{-1}+b^{-1}=\dfrac{a+b}{ab}\) और नीचे ((ab)^{-1}=\dfrac{1}{ab}), इसलिए उत्तर (a+b) है। परीक्षा में common denominator बनाएं।
\(125^{\frac{2}{3}}=25\) and \(25^{\frac{1}{2}}=5\), so the value is (5). In exams, separate fractional exponents into root and power.
Step 2
Why this answer is correct
The correct answer is A. (,5,). \(125^{\frac{2}{3}}=25\) and \(25^{\frac{1}{2}}=5\), so the value is (5). In exams, separate fractional exponents into root and power.
Step 3
Exam Tip
\(125^{\frac{2}{3}}=25\) और \(25^{\frac{1}{2}}=5\), इसलिए मान (5) है। परीक्षा में fractional exponents को root और power में अलग करें।
\(4^{-1}-5^{-1}=\dfrac{1}{4}-\dfrac{1}{5}=\dfrac{1}{20}\), so the whole value is (20). In exams, first convert negative powers into fractions.
Step 2
Why this answer is correct
The correct answer is A. (,20,). \(4^{-1}-5^{-1}=\dfrac{1}{4}-\dfrac{1}{5}=\dfrac{1}{20}\), so the whole value is (20). In exams, first convert negative powers into fractions.
Step 3
Exam Tip
\(4^{-1}-5^{-1}=\dfrac{1}{4}-\dfrac{1}{5}=\dfrac{1}{20}\), इसलिए पूरा मान (20) है। परीक्षा में negative powers को पहले fractions में बदलें।
Multiplying by \(2+\sqrt{3}\) makes the denominator (4-3=1). In exams, multiply both numerator and denominator by the conjugate.
Step 2
Why this answer is correct
The correct answer is A. \(,6+3\sqrt{3},\). Multiplying by \(2+\sqrt{3}\) makes the denominator (4-3=1). In exams, multiply both numerator and denominator by the conjugate.
Step 3
Exam Tip
हर को \(2+\sqrt{3}\) से गुणा करने पर हर (4-3=1) हो जाता है। परीक्षा में conjugate से numerator और denominator दोनों को गुणा करें।
\(\sqrt{98}=7\sqrt{2}\), \(\sqrt{72}=6\sqrt{2}\), and \(\sqrt{50}=5\sqrt{2}\), so the answer is \(8\sqrt{2}\). In exams, first write all surds in simplest form.
Step 2
Why this answer is correct
The correct answer is A. \(,8\sqrt{2},\). \(\sqrt{98}=7\sqrt{2}\), \(\sqrt{72}=6\sqrt{2}\), and \(\sqrt{50}=5\sqrt{2}\), so the answer is \(8\sqrt{2}\). In exams, first write all surds in simplest form.
Step 3
Exam Tip
\(\sqrt{98}=7\sqrt{2}\), \(\sqrt{72}=6\sqrt{2}\) और \(\sqrt{50}=5\sqrt{2}\), इसलिए उत्तर \(8\sqrt{2}\) है। परीक्षा में पहले सभी surds को simplest form में लिखें।
The numerator is ((2x)3\(3x^{-2}\)=8x-3\cdot 3x^{-2}=24x), and \(\dfrac{24x}{12x^{-1}}=2x^2\). In exams, simplify both coefficient and variable parts.
Step 2
Why this answer is correct
The correct answer is A. \(,2x^2,\). The numerator is ((2x)3\(3x^{-2}\)=8x-3\cdot 3x^{-2}=24x), and \(\dfrac{24x}{12x^{-1}}=2x^2\). In exams, simplify both coefficient and variable parts.
Step 3
Exam Tip
ऊपर ((2x)3\(3x^{-2}\)=8x-3\cdot 3x^{-2}=24x), और \(\dfrac{24x}{12x^{-1}}=2x^2\)। परीक्षा में coefficient और variable दोनों सरल करें।
\(9^2=3^4\) and \(27^{-1}=3^{-3}\), so the value is \(3^{-2+4-(-3)}=3^5=243\). In exams, be careful while subtracting a negative exponent.
Step 2
Why this answer is correct
The correct answer is A. (,243,). \(9^2=3^4\) and \(27^{-1}=3^{-3}\), so the value is \(3^{-2+4-(-3)}=3^5=243\). In exams, be careful while subtracting a negative exponent.
Step 3
Exam Tip
\(9^2=3^4\) और \(27^{-1}=3^{-3}\), इसलिए मान \(3^{-2+4-(-3)}=3^5=243\) है। परीक्षा में negative exponent घटाते समय सावधान रहें।
The numerator difference is (6x-2y+2y-3=2y\(3x^2+y^2\)), so division gives \(3x^2+y^2\). In exams, take out the common factor.
Step 2
Why this answer is correct
The correct answer is A. \(,3x^2+y^2,\). The numerator difference is (6x-2y+2y-3=2y\(3x^2+y^2\)), so division gives \(3x^2+y^2\). In exams, take out the common factor.
Step 3
Exam Tip
ऊपर का अंतर (6x-2y+2y-3=2y\(3x^2+y^2\)) है, इसलिए भाग देने पर \(3x^2+y^2\) मिलता है। परीक्षा में common factor निकालें।
Because \(\sqrt{a^4}=a^2\) and \(\sqrt{b^2}=b\), the simplified form is \(a^2b\). In exams, note the positive condition.
Step 2
Why this answer is correct
The correct answer is A. \(,a^2b,\). Because \(\sqrt{a^4}=a^2\) and \(\sqrt{b^2}=b\), the simplified form is \(a^2b\). In exams, note the positive condition.
Step 3
Exam Tip
क्योंकि \(\sqrt{a^4}=a^2\) और \(\sqrt{b^2}=b\), इसलिए सरल रूप \(a^2b\) है। परीक्षा में positive condition को ध्यान में रखें।
((64)^{\frac{1}{3}}=4), (\(x^6\)^{\frac{1}{3}}=x-2), and (\(y^{-3}\)^{\frac{1}{3}}=y^{-1}), so the answer is \(\dfrac{4x^2}{y}\). In exams, apply the exponent to each factor.
Step 2
Why this answer is correct
The correct answer is A. \(,\dfrac{4x^2}{y},\). ((64)^{\frac{1}{3}}=4), (\(x^6\)^{\frac{1}{3}}=x-2), and (\(y^{-3}\)^{\frac{1}{3}}=y^{-1}), so the answer is \(\dfrac{4x^2}{y}\). In exams, apply the exponent to each factor.
Step 3
Exam Tip
((64)^{\frac{1}{3}}=4), (\(x^6\)^{\frac{1}{3}}=x-2) और (\(y^{-3}\)^{\frac{1}{3}}=y^{-1}), इसलिए उत्तर \(\dfrac{4x^2}{y}\) है। परीक्षा में प्रत्येक factor पर घात लगाएं।
On expansion, ((x+1)3=x-3+3x-2+3x+1) and ((x-1)3=x-3-3x-2+3x-1), so the difference is \(6x^2+2\). In exams, expand cubes carefully.
Step 2
Why this answer is correct
The correct answer is A. \(,6x^2+2,\). On expansion, ((x+1)3=x-3+3x-2+3x+1) and ((x-1)3=x-3-3x-2+3x-1), so the difference is \(6x^2+2\). In exams, expand cubes carefully.
Step 3
Exam Tip
विस्तार करने पर ((x+1)3=x-3+3x-2+3x+1) और ((x-1)3=x-3-3x-2+3x-1), इसलिए अंतर \(6x^2+2\) है। परीक्षा में cube expansion ध्यान से करें।
Changing all signs in the second bracket gives \(2y^3-y+5-5y^3-4y+8\). In exams, change the sign of every term during subtraction.
Step 2
Why this answer is correct
The correct answer is A. \(,-3y^3-5y+13,\). Changing all signs in the second bracket gives \(2y^3-y+5-5y^3-4y+8\). In exams, change the sign of every term during subtraction.
Step 3
Exam Tip
दूसरे bracket के सभी signs बदलने पर \(2y^3-y+5-5y^3-4y+8\) मिलता है। परीक्षा में subtraction में हर पद का sign बदलें।
(x-4-81=\(x^2-9\)\(x^2+9\)), so the simplified form is \(x^2-9\). In exams, treat \(x^4\) as (\(x^2\)2) while factoring.
Step 2
Why this answer is correct
The correct answer is A. \(,x^2-9,\). (x-4-81=\(x^2-9\)\(x^2+9\)), so the simplified form is \(x^2-9\). In exams, treat \(x^4\) as (\(x^2\)2) while factoring.
Step 3
Exam Tip
(x-4-81=\(x^2-9\)\(x^2+9\)), इसलिए सरल रूप \(x^2-9\) है। परीक्षा में \(x^4\) को (\(x^2\)2) मानकर factor करें।
Inside, \(2^{-3}+2^{-2}=\dfrac{1}{8}+\dfrac{1}{4}=\dfrac{3}{8}\), so the power (-1) gives \(\dfrac{8}{3}\). In exams, simplify the bracket first.
Step 2
Why this answer is correct
The correct answer is A. \(,\dfrac{8}{3},\). Inside, \(2^{-3}+2^{-2}=\dfrac{1}{8}+\dfrac{1}{4}=\dfrac{3}{8}\), so the power (-1) gives \(\dfrac{8}{3}\). In exams, simplify the bracket first.
Step 3
Exam Tip
अंदर \(2^{-3}+2^{-2}=\dfrac{1}{8}+\dfrac{1}{4}=\dfrac{3}{8}\), इसलिए (-1) घात से \(\dfrac{8}{3}\) मिलता है। परीक्षा में bracket को पहले सरल करें।
(\left\(\dfrac{9}{4}\right\)^{\frac{1}{2}}=\dfrac{3}{2}), so (\left\(\dfrac{9}{4}\right\)^{\frac{3}{2}}=\left\(\dfrac{3}{2}\right\)3=\dfrac{27}{8}). In exams, take the square root first.
Step 2
Why this answer is correct
The correct answer is A. \(,\dfrac{27}{8},\). (\left\(\dfrac{9}{4}\right\)^{\frac{1}{2}}=\dfrac{3}{2}), so (\left\(\dfrac{9}{4}\right\)^{\frac{3}{2}}=\left\(\dfrac{3}{2}\right\)3=\dfrac{27}{8}). In exams, take the square root first.
Step 3
Exam Tip
(\left\(\dfrac{9}{4}\right\)^{\frac{1}{2}}=\dfrac{3}{2}), इसलिए (\left\(\dfrac{9}{4}\right\)^{\frac{3}{2}}=\left\(\dfrac{3}{2}\right\)3=\dfrac{27}{8})। परीक्षा में square root पहले निकालें।
This is of the form ((A+B)2-(A-B)2=4AB), where (A=3x) and (B=2), so the answer is (24x). In exams, identities save time.
Step 2
Why this answer is correct
The correct answer is A. (,24x,). This is of the form ((A+B)2-(A-B)2=4AB), where (A=3x) and (B=2), so the answer is (24x). In exams, identities save time.
Step 3
Exam Tip
यह ((A+B)2-(A-B)2=4AB) का रूप है, जहां (A=3x) और (B=2), इसलिए उत्तर (24x) है। परीक्षा में identity से समय बचता है।
Since \(\sqrt{8}=2\sqrt{2}\), (\(\sqrt{2}+\sqrt{8}\)2=\(3\sqrt{2}\)2=18). In exams, simplify the surd before squaring.
Step 2
Why this answer is correct
The correct answer is A. (,18,). Since \(\sqrt{8}=2\sqrt{2}\), (\(\sqrt{2}+\sqrt{8}\)2=\(3\sqrt{2}\)2=18). In exams, simplify the surd before squaring.
Step 3
Exam Tip
क्योंकि \(\sqrt{8}=2\sqrt{2}\), इसलिए (\(\sqrt{2}+\sqrt{8}\)2=\(3\sqrt{2}\)2=18)। परीक्षा में वर्ग करने से पहले surd सरल करें।
Inside, \(\dfrac{a^2}{b^{-3}}=a^2b^3\), and applying the power (-2) gives \(\dfrac{1}{a^4b^6}\). In exams, simplify the inside part first.
Step 2
Why this answer is correct
The correct answer is A. \(,\dfrac{1}{a^4b^6},\). Inside, \(\dfrac{a^2}{b^{-3}}=a^2b^3\), and applying the power (-2) gives \(\dfrac{1}{a^4b^6}\). In exams, simplify the inside part first.
Step 3
Exam Tip
अंदर \(\dfrac{a^2}{b^{-3}}=a^2b^3\), और (-2) घात लगाने पर \(\dfrac{1}{a^4b^6}\) मिलता है। परीक्षा में अंदर का भाग पहले सरल करें।