fixes

ch00.asciidoc

@@ -135,11 +135,11 @@ People can pay for goods and services using bitcoin as the currency. mg
 Bitcoin transactions, which transfer value from one bitcoin address to another, are recorded in a distributed ledger, called the _blockchain_. In simple terms, think of the ledger as a book with lines like this:
 
 ----
-Address 27 gave 2 bitcoin to address 81
-Address 132 gave 1.05 bitcoin to address 22
-25 bitcoin were mined to address 76 
-Address 13 gave 0.5 bitcoin to address 52
-Address 52 gave 0.015 bitcoin to address 166
+- Address 27 gave 2 bitcoin to address 81
+- Address 132 gave 1.05 bitcoin to address 22
+- 25 bitcoin were mined to address 76 
+- Address 13 gave 0.5 bitcoin to address 52
+- Address 52 gave 0.015 bitcoin to address 166
 ----
 
 The ledger is a record of all bitcoin transactions and can be independently verified by every node.

ch01.asciidoc

@@ -39,32 +39,33 @@ Elliptic curve multiplication can be visualized on a curve as drawing a line con
 .Elliptic Curve Cryptography: Visualizing the addition operator on the points of an elliptic curve
 image::images/ecc-addition.png["Addition operator on points of an elliptic curve"]
 
-Bitcoin specifically uses the +secp256k1+ elliptic curve which is a standardized curve on a group field of large prime order:
+Bitcoin specifically uses the +secp256k1+ elliptic curve:
 
 [latexmath]
 ++++
 \begin{equation}
 {y^2 = (x^3 + 7)} over \mathbb{F}_p
+\end{equation}
+++++
 
 or 
 
+[latexmath]
+++++
+\begin{equation}
 {y^2 \mod p = (x^3 + 7) \mod p}
-
-where p = 0xFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFEFFFFFC2F, a very large prime. 
-
 \end{equation}
 ++++
 
+where +p = 0xFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFFEFFFFFC2F+, a very large prime. 
+
+
 The +mod p+ indicates that this curve is over a finite field of prime order +p+, also written as F(p). The curve looks like a pattern of dots scattered in two dimensions, which makes it difficult to visualize. However, the math is identical as that of an elliptic curve over the real numbers shown above.
 
 [[ecc-over-F37-math]]
 .Elliptic Curve Cryptography: Visualizing the addition operator on the points of an elliptic curve over F(p)
 image::images/ecc-over-F37-math.png["Addition operator on points of an elliptic curve over F(p)"]
 
-[TIP]
-====
-The bitcoin private key is just a number. A public key can be generated from any private key. Therefore, a public key can be generated from any number, up to 256-bits long. You can pick your keys randomly using a method as simple as dice, pencil and paper. 
-====
 
 ==== Generating bitcoin keys
 
@@ -72,10 +73,11 @@ The first and most important step in generating keys is to find a secure source
 
 [TIP]
 ====
-The size of bitcoin's private key, 2^256^ is a truly unfathomable number. It is equal to approximately 10^77^ in decimal. The visible universe contains approximately 10^80^ atoms.
+The bitcoin private key is just a number. A public key can be generated from any private key. Therefore, a public key can be generated from any number, up to 256-bits long. You can pick your keys randomly using a method as simple as dice, pencil and paper. 
 ====
 
 
+
 [[privkey_gen]]
 .Private key generation: From random mouse movements to a 256-bit number used as the private key
 image::images/privkey-gen.png["Private key generation"]
@@ -138,7 +140,10 @@ err:
 <1> Multiplying the priv_key by the generator point of the elliptic curve group, produces the pub_key
 ====
 
-
+[TIP]
+====
+The size of bitcoin's private key, 2^256^ is a truly unfathomable number. It is equal to approximately 10^77^ in decimal. The visible universe contains approximately 10^80^ atoms.
+====
 
 
 === Simple Transactions