1. 若$7^{m}=2,7^{n}=3$,则$7^{2 + m + n}$的值为________.
答案
294
2. 如果$a^{c}=b$,那么我们规定$(a,b)=c$,例如:因为$2^{3}=8$,所以$(2,8)=3$.
(1)根据上述规定,填空:$(3,27)=$________,$(4,1)=$________,$(2,0.25)=$________;
(2)记$(3,5)=a,(3,6)=b,(3,30)=c$,试说明:$a + b = c$.
(1)根据上述规定,填空:$(3,27)=$________,$(4,1)=$________,$(2,0.25)=$________;
(2)记$(3,5)=a,(3,6)=b,(3,30)=c$,试说明:$a + b = c$.
答案
(1)3 0 -2 (2)因为(3,5)=a,(3,6)=b,(3,30)=c,所以$3^{a}=5,$$3^{b}=6,$$3^{c}=30,$所以$3^{a}×3^{b}=30,$所以$3^{a}×3^{b}=3^{c},$所以a + b = c
3. 已知$9^{m}=3,27^{n}=4$,则$3^{2m + 3n}$的值为( )
A. 1
B. 6
C. 7
D. 12
A. 1
B. 6
C. 7
D. 12
答案
D
4. 若$2^{p}=m,m^{q}=n,n^{r}=32$,则$pqr$的值为________.
答案
5
5. 求下列等式中$x,y$的值:
(1)$2^{2x}+4^{x}=32$;
(2)$2\times4^{x}\times16^{y}=2^{19}$;
(3)$x^{3}=64^{2}=y^{-4}$.
(1)$2^{2x}+4^{x}=32$;
(2)$2\times4^{x}\times16^{y}=2^{19}$;
(3)$x^{3}=64^{2}=y^{-4}$.
答案
(1)原等式可化为$2×2^{2x}=2^{5},$即1 + 2x = 5,解得x = 2
(2)原等式可化为$2×2^{2y}×2^{4y}=2^{19},$即1 + 2y + 4y = 19,解得y = 3 (3)原等式可化为$x^{3}=16^{3},$$(\frac{1}{8})^{-4}=y^{-4},$解得x = 16,$y=\frac{1}{8}$
(2)原等式可化为$2×2^{2y}×2^{4y}=2^{19},$即1 + 2y + 4y = 19,解得y = 3 (3)原等式可化为$x^{3}=16^{3},$$(\frac{1}{8})^{-4}=y^{-4},$解得x = 16,$y=\frac{1}{8}$
6. 已知$x = 5^{m + 2},y = 25^{m}-3$.
(1)请用含$x$的代数式表示$y$;
(2)如果$x = - 3$,求此时$y$的值.
(1)请用含$x$的代数式表示$y$;
(2)如果$x = - 3$,求此时$y$的值.
答案
(1)因为$x = 5^{m + 2}=5^{m}×5^{2},$所以$5^{m}=\frac{1}{25}x。$因为$25^{m}=5^{2m}=(5^{m})^{2},$所以$y=(5^{m})^{2}-3=(\frac{1}{25}x)^{2}-3=\frac{1}{625}x^{2}-3 (2)$当x = -3时,$y=\frac{1}{625}×(-3)^{2}-3=-2\frac{616}{625}$
