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Formula
Calculate the value
Answer
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$\dfrac{ 7 }{ 12 } \times 4$
$\dfrac { 7 } { 3 }$
Calculate the value
$\dfrac { 7 } { 12 } \color{#FF6800}{ \times } \color{#FF6800}{ 4 }$
$ $ Natural numbers can be expressed as fractions with a denominator of 1 $ $
$\dfrac { 7 } { 12 } \color{#FF6800}{ \times } \color{#FF6800}{ \dfrac { 4 } { 1 } }$
$\dfrac { 7 } { \color{#FF6800}{ 12 } } \times \dfrac { \color{#FF6800}{ 4 } } { 1 }$
$ $ Reduce all denominators and numerators that can be reduced $ $
$\dfrac { 7 } { \color{#FF6800}{ 3 } } \times \dfrac { \color{#FF6800}{ 1 } } { 1 }$
$\color{#FF6800}{ \dfrac { 7 } { 3 } } \color{#FF6800}{ \times } \color{#FF6800}{ \dfrac { 1 } { 1 } }$
$ $ numerator multiply between numerator, and denominators multiply between denominators $ $
$\color{#FF6800}{ \dfrac { 7 \times 1 } { 3 \times 1 } }$
$\dfrac { 7 \color{#FF6800}{ \times } \color{#FF6800}{ 1 } } { 3 \times 1 }$
$ $ Multiplying any number by 1 does not change the value $ $
$\dfrac { \color{#FF6800}{ 7 } } { 3 \times 1 }$
$\dfrac { 7 } { 3 \color{#FF6800}{ \times } \color{#FF6800}{ 1 } }$
$ $ Multiplying any number by 1 does not change the value $ $
$\dfrac { 7 } { \color{#FF6800}{ 3 } }$
Solution search results
search-thumbnail-In the following problem $a,b,$ b,and c represent REAL NUMBERS. The derivative of $g\left(x\right)=log _{a}\left(bx\right)+cx^{2}is$ $○$ $g^{1}\left(x\right)=\right)dfrac\left(b\right)log _{-}a\left(bx\right)\right)\left(N1n$ $a\right)+2cx1\right)$ $○$ $\left(g\left(x\right)=\right)dtracb$ $loga\left(bx\right)+2c\times \right)Nln$ a}\) $○$ $g^{'}\left(x\right)=\left(dfraC\left(a\right)log _{-}a\left(bx\right)\right)\left(ln$ $\right)+2c\times 1\right)\right)$ $○$ $g^{1}\left(x\right)=\left(dfrac\left(b$ $log _{-}a\left(bx\right)\right)\left(ln$ $a1\right)$ $○$ $\left(\left(g^{1}\left(x\right)=b$ $log _{-}a\left(bx\right)+2cx1\right)$ $○$ $g\left(x\right)=\left(dfrac\left(b$ $log _{-}a\left(bx\right)\right)\left(1ln$ $a|+2c1\right)$
Calculus
Check solution
search-thumbnail-$\dfrac {3} {10}p+\dfrac {7} {12}=\left(\square p+\dfrac {1} {4}\right)$ $-\left(\dfrac {7} {10}p-\square \right)$ $\left(Ty$ (Type integers or simplified fractions.)
10th-13th grade
Other
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1st-6th grade
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7th-9th grade
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